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Cell wall and cytoskeletal contributions in single cell biomechanics of Nicotiana tabacum

Published online by Cambridge University Press:  21 January 2022

Leah Ginsberg
Affiliation:
Division of Engineering and Applied Science, California Institute of Technology, Pasadena, CA 91125, USA
Robin McDonald
Affiliation:
Division of Engineering and Applied Science, California Institute of Technology, Pasadena, CA 91125, USA
Qinchen Lin
Affiliation:
Department of Materials Science and Engineering, University of Washington, Seattle, WA 98195, USA
Rodinde Hendrickx
Affiliation:
Division of Engineering and Applied Science, California Institute of Technology, Pasadena, CA 91125, USA
Giada Spigolon
Affiliation:
Biological Imaging Facility, California Institute of Technology, Pasadena, CA 91125, USA
Guruswami Ravichandran
Affiliation:
Division of Engineering and Applied Science, California Institute of Technology, Pasadena, CA 91125, USA
Chiara Daraio
Affiliation:
Division of Engineering and Applied Science, California Institute of Technology, Pasadena, CA 91125, USA
Eleftheria Roumeli*
Affiliation:
Department of Materials Science and Engineering, University of Washington, Seattle, WA 98195, USA
*
Author for correspondence: E. Roumeli, E-mail: [email protected]

Abstract

Studies on the mechanics of plant cells usually focus on understanding the effects of turgor pressure and properties of the cell wall (CW). While the functional roles of the underlying cytoskeleton have been studied, the extent to which it contributes to the mechanical properties of cells is not elucidated. Here, we study the contributions of the CW, microtubules (MTs) and actin filaments (AFs), in the mechanical properties of Nicotiana tabacum cells. We use a multiscale biomechanical assay comprised of atomic force microscopy and micro-indentation in solutions that (i) remove MTs and AFs and (ii) alter osmotic pressures in the cells. To compare measurements obtained by the two mechanical tests, we develop two generative statistical models to describe the cell’s behaviour using one or both datasets. Our results illustrate that MTs and AFs contribute significantly to cell stiffness and dissipated energy, while confirming the dominant role of turgor pressure.

Type
Original Research Article
Creative Commons
Creative Common License - CCCreative Common License - BY
This is an Open Access article, distributed under the terms of the Creative Commons Attribution licence (https://creativecommons.org/licenses/by/4.0/), which permits unrestricted re-use, distribution, and reproduction in any medium, provided the original work is properly cited.
Copyright
© The Author(s), 2022. Published by Cambridge University Press in association with The John Innes Centre

1. Introduction

The mechanical properties of plant cells are tightly related to their growth, function, adaptation and survival (Cosgrove, Reference Cosgrove2016; Milani et al., Reference Milani, Braybrook and Boudaoud2013; Szymanski & Cosgrove, Reference Szymanski and Cosgrove2009). Enabled by recent developments in mechanical testing and imaging capabilities, the mechanical properties of plant cells have been increasingly studied (Bidhendi & Geitmann, Reference Bidhendi and Geitmann2019; Burgert, Reference Burgert2006; Geitmann, Reference Geitmann2006; Vogler et al., Reference Vogler, Felekis, Nelson and Grossniklaus2015; Wu et al., Reference Wu, Aroush, Asnacios, Chen, Dokukin, Doss, Durand-Smet, Ekpenyong, Guck, Guz, Janmey, Lee, Moore, Ott, Poh, Ros, Sander, Sokolov, Staunton and Wang2018). The largest body of literature focuses on the properties of the cell wall (CW) and turgor pressure to understand and model the mechanical behaviour of the entire plant cell (Bidhendi & Geitmann, Reference Bidhendi and Geitmann2019; Braybrook, Reference Braybrook2015; Tomos & Leigh, Reference Tomos and Leigh1999; Weber et al., Reference Weber, Braybrook, Huflejt, Mosca, Routier-Kierzkowska and Smith2015; Wu et al., Reference Wu, Aroush, Asnacios, Chen, Dokukin, Doss, Durand-Smet, Ekpenyong, Guck, Guz, Janmey, Lee, Moore, Ott, Poh, Ros, Sander, Sokolov, Staunton and Wang2018). This is in contrast to studies in (wall-less) animal cells, in which the structural roles of the main cytoskeletal filaments, microtubules (MT) and actin filaments (AF), have been established (Gardel et al., Reference Gardel, Kasza, Brangwynne, Liu and Weitz2008; Huber et al., Reference Huber, Boire, López and Koenderink2015; Janmey, Reference Janmey1991; Pegoraro et al., Reference Pegoraro, Janmey and Weitz2017). In both plant and animal cells, the cytoskeletal filaments form an interconnected network of polymer nanofibres that are responsible for providing structure, and for transducing mechanical signals to assist cell growth, function and development (Durand-Smet et al., Reference Durand-Smet, Chastrette, Guiroy, Richert, Berne-Dedieu, Szecsi, Boudaoud, Frachisse, Bendahmane, Hamant and Asnacios2014; Janmey, Reference Janmey1998). Even though the contributions of cytoskeletal filaments in the mechanical properties of plant cells are of high interest, their direct measurement is challenging due to the presence of the stiff CW in addition to the high turgor pressure inside plant cells. Recent findings show that MTs have a leading role in guiding cellulose deposition in the CW, which indirectly influences the mechanical properties of the CW (Durand-Smet et al., Reference Durand-Smet, Chastrette, Guiroy, Richert, Berne-Dedieu, Szecsi, Boudaoud, Frachisse, Bendahmane, Hamant and Asnacios2014; Paredez et al., Reference Paredez, Somerville and Ehrhardt2006). Additionally, rheological tests on plant cells treated to remove their CW show that MTs, in particular, have non-negligible mechanical contributions compared to the CW and turgor pressure (Durand-Smet et al., Reference Durand-Smet, Chastrette, Guiroy, Richert, Berne-Dedieu, Szecsi, Boudaoud, Frachisse, Bendahmane, Hamant and Asnacios2014). Nevertheless, the mechanical contributions of the cytoskeleton in intact plant cells remain unexplored.

During the past decade, advances in mechanical testing instrumentation have enabled remarkable new insights on the importance of plant cell mechanics in plant development. Atomic-force microscopy (AFM), has been used to quantify the elastic modulus of the CW (Braybrook, Reference Braybrook2015; Peaucelle et al., Reference Peaucelle, Braybrook, Le Guillou, Bron, Kuhlemeier and Höfte2011), as well as to estimate the turgor pressure (Beauzamy et al., Reference Beauzamy, Derr and Boudaoud2015; Vella et al., Reference Vella, Ajdari, Vaziri and Boudaoud2012). AFM results combined with finite element modelling (FEM)provided evidence that in Arabidopsis thaliana (Arabidopsis) pavement cells, the orientation of MTs to mechanical stresses plays a dominant role in guiding cell shape (Sampathkumar et al., Reference Sampathkumar, Krupinski, Wightman, Milani, Berquand, Boudaoud, Hamant, Jönsson and Meyerowitz2014). Moreover, AFM has been used to reveal the different elastic properties of the CW in turgid versus plasmolysing solutions in Arabidopsis epidermal cells, highlighting the effects of different stress states in the CW modulus (Braybrook, Reference Braybrook2015). Overall, the AFM nano-indentation method allows for the simultaneous acquisition of highly resolved topographical information and mechanical property mapping (Peaucelle et al., Reference Peaucelle, Braybrook, Le Guillou, Bron, Kuhlemeier and Höfte2011; Yilmaz et al., Reference Yilmaz, Kodama and Numata2020). The applied forces are typically in the pico- to nano-Newton range, and the indenter sizes are a few nanometres wide, which makes the method suitable for highly localised cell properties. When global cell properties are of interest, micron-sized indenters and higher force load cells are required.

Cellular-force microscopy, a method coupling a micro-indentation device with a light microscope, has been applied for such global, cell-level measurements (Nelson, Reference Nelson2011; Routier-Kierzkowska et al., Reference Routier-Kierzkowska, Weber, Kochova, Felekis, Nelson, Kuhlemeier and Smith2012; Vogler et al., Reference Vogler, Felekis, Nelson and Grossniklaus2015; Weber et al., Reference Weber, Braybrook, Huflejt, Mosca, Routier-Kierzkowska and Smith2015). This apparatus allows for acquisition of micro-indentation data on isolated plant cells, with applied forces in the micro-Newton range. It has been used to obtain direct stiffness measurements of onion epidermal cells which revealed turgor pressure-induced stiffening of the CW and spatial stiffness variations across the tissue surface. In particular, in turgid cells, the surface above the cross-wall junction was softer compared to the middle part of the cells which was stiffer (Routier-Kierzkowska et al., Reference Routier-Kierzkowska, Weber, Kochova, Felekis, Nelson, Kuhlemeier and Smith2012). When used in combination with a computational mechanics model, cellular-force microscopy can be used to extract material properties of subcellular components, such as the elastic modulus of the CW material (Weber et al., Reference Weber, Braybrook, Huflejt, Mosca, Routier-Kierzkowska and Smith2015).

As more experimental methods to characterise the mechanical properties of plant cells have been adopted, discrepancies arising from comparing results from separate studies have emerged (Bidhendi & Geitmann, Reference Bidhendi and Geitmann2019; Braybrook, Reference Braybrook2015; Vogler et al., Reference Vogler, Felekis, Nelson and Grossniklaus2015). Differences in the sample preparation, loading rate and orientation, indenter shape and size, extent of deformation, models and assumptions for data analysis, on top of variations between samples, justify the literature discrepancies even when the same experimental method is applied (Bidhendi & Geitmann, Reference Bidhendi and Geitmann2019).

Here, we present a method to compare extracted mechanical properties of plant cells using two techniques: AFM and micro-indentation. This method provides insights into the mechanical contributions of CW, turgor pressure and cytoskeletal filaments in intact Nicotiana tabacum Bright Yellow-2 (BY-2) cells, without requiring a complex computational mechanics model of the system. Our multiscale biomechanical assay allows us to probe mechanical properties across multiple length scales which is essential to evaluate the contributions of cytoskeletal fibres, that are a few nanometres in diameter, the CW, which when hydrated is around a micrometre thick, and the bulk protoplasm which is tens of micrometres in diameter and length. To evaluate the effects of turgor pressure, we test cells in solutions of two different osmolarities. In order to isolate the mechanical contribution of the cytoskeleton, we test cells after short exposure to drug treatments that depolymerise MTs and AFs, respectively. We propose a combination of a generative statistical model and a simplified mechanical spring model to analyse the mechanical testing results. This approach allows us to determine the relative stiffness contributions from the CW, MTs, AFs and the rest of the protoplasm, from two independent experimental methods and without the need to create a FEM. To test the stability of our generative statistical model, we perform an analysis solely based on the micro-indentation data, and then, perform a combined AFM and micro-indentation data analysis. The combined AFM and micro-indentation data analysis more accurately captures the difference in stiffness between the MTs and AFs by taking into account the observed connection between the cytoskeletal filaments and the CW using AFM in conjunction with the micro-indentation data.

2. Results and discussion

2.1. Cell morphology

We observe the morphology of the unstained BY-2 cells using light microscopy, and upon staining with calcofluor white, we image the cells with confocal laser scanning microscopy (CLSM) (Figure S1a,b). The hydrated CW thickness as visualised in a near-native state from CLSM images is measured to be $0.79 \pm 0.02\, \unicode{x3bc} $ m (mean $\pm $ standard error), which is similar to values reported for other thin-walled cells in the literature (Moghaddam & Wilman, Reference Moghaddam and Wilman1998; Radotić et al., Reference Radotić, Roduit, Simonović, Hornitschek, Fankhauser, Mutavdžić, Steinbach, Dietler and Kasas2012; Yakubov et al., Reference Yakubov, Bonilla, Chen, Doblin, Bacic, Gidley and Stokes2016). The observed BY-2 cells are elongated, approximately cylindrical, with cell length and diameter values presented in Figure S1c,d, as measured from light microscopy. The mean observed cell length is $105.43 \pm 3.45 \text { }\unicode{x3bc} $ m, and the mean observed cell diameter is $39.12 \pm 0.55\text { }\unicode{x3bc} $ m, in agreement with prior literature (Čovanová et al., Reference Čovanová, Sauer, Rychtář, Friml, Petrášek and Zažímalová2013; Sieberer et al., Reference Sieberer, Kieft, Franssen-Verheijen, Emons and Vos2009).

BY-2 marker cell lines expressing GFP-tubulin $\alpha $ that visualises MTs (GFP-BY2- $\alpha $ ), and GFP-AtFim1 to visualise AFs (GFP-BY2-F) were used to study the cytoskeletal changes in response to the selected chemical treatments, which disrupt each of the two networks so that their mechanical property contributions can be isolated. By visualising the cells and their cytoskeleton through CLSM in normal growth media and after short exposures (2 min) to 250  $\unicode{x3bc} $ M latrunculin B (LatB) or 50 $\unicode{x3bc} $ M oryzalin solutions, fluorescent and transmitted light images demonstrate that the short treatment was enough to disrupt the AF and MT networks, without causing plasmolysis or other observable microscopic defects in the cells. Short-term exposures to the drug treatments are chosen to avoid secondary effects of removing components of the cytoskeleton. For example, MTs are known to be linked to the orientation of cellulose microfibrils in the CW, so long-term disruption of MTs could alter the alignment of the cellulose microfibrils, which would in turn inhibit the biological function of the CW (Cosgrove, Reference Cosgrove2014). Example images of the marker lines before and after short exposures to drug treatments and plasmolysing solution are presented in Figure 1. Additional Z-stacked images of BY-2 marker cells in GM illustrating the transversely oriented (with respect to the cell growth axis) MTs and the more isotropically oriented AFs are provided in Figure S2.

Figure 1. CLSM images on BY-2 marker lines to visualise the effects of short duration drug treatments on MTs and AFs. The model representation of MTs and AFs are included as insets in each image panel. (a)–(c) CLSM images of GFP-BY2- $\alpha $ cells in growth media-based solutions. White arrows point to larger bundles of MTs that are visible near the CW. (a) Fluorescence image in pure growth media. (b) Fluorescence image after exposure to growth media-based oryzalin solution. (c) Corresponding transmission light image for (b), showing no visual morphological change in the cell as a result of the short-term exposure to the drug treatment. (d)–(f) CLSM images of GFP-BY2-F cells in growth media-based solutions. Red arrows point to visible larger bundles of polymerised AFs. (d) Fluorescence image in pure growth media. (e) Fluorescence image after exposure to growth media-based LatB solution. (f) Corresponding transmission light image for (e), showing no evident morphological change in the cell as a result of the treatment. (g)–(i) CLSM images of GFP-BY2- $\alpha $ cells in sorbitol. (g) Fluorescence image. (h) Combined fluorescence and transmission light image of (g and i). (i) Transmission light image. (j)–(l) CLSM images of GFP-BY2-F cells in sorbitol. (j) Fluorescence image. Red arrows point to visible larger bundles of polymerised AFs. (k) Combined fluorescence and transmission light image of (j and l). (l) Transmission light image. In panels (h, i, k and l) white arrows point to CWs and black arrows point to plasma membranes, which have retracted from the CW. All scale bars are 20 $\unicode{x3bc} $ m.

2.2. AFM analysis

We subject the wild-type BY-2 cells to AFM tests in GM (growth media) and PS (plasmolysing solution) to evaluate indentation moduli of the CW in solutions of different osmotic pressures. To determine any effects of MT and AF removal on the elastic properties of the CW, we subject the cells to short treatments of oryzalin (Durand-Smet et al., Reference Durand-Smet, Chastrette, Guiroy, Richert, Berne-Dedieu, Szecsi, Boudaoud, Frachisse, Bendahmane, Hamant and Asnacios2014), or LatB (Durst et al., Reference Durst, Hedde, Brochhausen, Nick, Nienhaus and Maisch2014; Maisch et al., Reference Maisch, Fišerová, Fischer and Nick2009), which are added to the GM or PS (see Section 2). There are six testing conditions: GM, GM–MT, GM–AF, PS, PS–MT, PS–AF, where -MT indicates the oryzalin treatment which depolymerises MTs, and -AF indicates the LatB treatment which removes AFs.

Considering that cellulose fibrils, which comprise the structural backbone of the CW, are known to be organised in 5–50 nm-thick bundles (Moon et al., Reference Moon, Martini, Nairn, Simonsen and Youngblood2011), and are immersed in a continuous, heterogeneous matrix of hemicellulose, pectin and proteins, we use an AFM tip with a spherical bead of 1 $\unicode{x3bc} $ m diameter to probe the bulk behaviour of the CW (Braybrook, Reference Braybrook2015). The average indentation depth for turgid cells is $84.7 \pm 4.7$ nm, which is shallow enough (with respect to the hydrated total CW thickness) to assume that the observed mechanical response is solely from the CW (Braybrook, Reference Braybrook2015; Milani et al., Reference Milani, Braybrook and Boudaoud2013; Radotić et al., Reference Radotić, Roduit, Simonović, Hornitschek, Fankhauser, Mutavdžić, Steinbach, Dietler and Kasas2012; Sampathkumar et al., Reference Sampathkumar, Krupinski, Wightman, Milani, Berquand, Boudaoud, Hamant, Jönsson and Meyerowitz2014). Plasmolysis of cells removes turgor pressure and enables deeper nano-indentations of the CW, without probing the protoplasm. The average indentation depth of plasmolysed cells is $217.0 \pm 45.8$ nm, which is approximately 20% of the hydrated CW thickness. This indentation depth is shallower, with respect to cell size, than other literature-reported indentations aiming to isolate the response of the CW alone (Peaucelle et al., Reference Peaucelle, Braybrook, Le Guillou, Bron, Kuhlemeier and Höfte2011). In all cases, the extracted CW modulus is reflective of the mechanical properties of the top layers of the CW material since that is the area of the CW which we are stressing with a shallow indentation force. Typical force-indentation and retraction data with an overlaid Hertz model fit is presented in Figure 2a, with example images from cells in each solution in the insets. The Young’s modulus results, separated by treatment, are presented in Figure 2b,c.

Figure 2. (a) Typical AFM force-indentation and retraction data from a cell in GM and in PS with Hertz fit to indentation data overlaid. Insets show corresponding images of cells in the AFM test in GM (left) and PS (right). Arrows point to CW (white) and retracted plasma membrane (black). Scale bars are 40 $\unicode{x3bc} $ m. (b) Plot of indentation moduli for cells in all drug treatments in GM. (c) Plot of indentation moduli for cells in all drug treatments in PS. Note the difference in scales between (b) and (c). Each point in the plot represents an indentation test. In each test condition, there are $n \geq 9$ tests from five biological replicates. Stars indicate significant differences in distributions according to the nonparametric Kolmogorov–Smirnov test. ** $p<0.05$ , *** $p<0.01$ .

Our data show that cells in all growth media-based solutions have a CW Young’s modulus ranging from 0.65 to 15.2 MPa, while in all plasmolysing solutions cells have a modulus ranging between 0.03 and 0.49 MPa. The non-parametric Kolmogorov–Smirnov test reveals that there is a significant difference between the CW moduli of cells tested in GM versus those in PS, with $p=4.4 \times 10^{-16}$ . Furthermore, the removal of AFs results in the largest reduction of Young’s modulus, in cells in both GM and PS. This observation suggests that there must be a connection between AFs and the CW that is detectable from the conducted AFM tests which probe local, exterior layers of the CW responses. The depolymerisation of MTs also reduces the Young’s modulus in GM, but does not make a significant difference in the cells tested in PS. Specifically, in absence of drug treatments in the GM solution, we observe a CW modulus of $E_{\text {GM}}=6.3 \pm 1.1$ MPa, which is significantly different from the moduli in GM–MT ( $E_{\text {GM-MT}}=4.2 \pm 0.6$ MPa) and GM–AF ( $E_{\text {GM-AF}}=2.2 \pm 0.1$ MPa) treatments, with p-values of 0.049 and $5.8 \times 10^{-5}$ , respectively. The GM–MT and GM–AF treatments also lead to significantly different CW moduli, with a p-value of $1.1 \times 10^{-4}$ . The CW modulus in pure PS treatment is $E_{\text {PS}}=270 \pm 60$ kPa and is significantly different from the PS–AF ( $E_{\text {PS-AF}}=130 \pm 30$ kPa) treatment, with a p-value of 0.0015. The CW moduli in PS–MT ( $E_{\text {PS-MT}}=300 \pm 30$ kPa) and PS–AF conditions are also significantly different, with a p-value of $1.1 \times 10^{-4}$ . Thus, from the nano-scale measurements, we draw two main conclusions: (a) the biggest changes in the CW modulus are caused by the changes in turgor pressure, and we confirm experimentally that the higher internal pressure stiffens the CW through stress, as predicted in (Cosgrove, Reference Cosgrove2016) and (b) there is an evident interconnection between the cytoskeleton and CW, which is manifested through CW softening in response to the cell being subjected to drug treatments targeting the cytoskeleton.

2.3. Micro-indentation experiments and generative spring model

For the micro-indentation experiments, BY-2 cells are tested in the same testing conditions as in the AFM experiments (see Section 2). Representative force curves and images from the micro-indentation test are provided in Figure 3. The imaging capabilities during mechanical testing allow us to clearly observe plasmolysis effects (Figure 3c) where a cell in PS has the plasma membrane peeled away from the outer CW and the protoplasm retracted.

Figure 3. (a) Representative force-indentation and retraction data obtained in micro-indentation experiments on cells in GM (growth media) and in PS (plasmolysing solution). (b) Image of BY-2 cells in GM taken from optical microscope of the micro-indentation testing apparatus. (c) Image of BY-2 cells in PS taken from optical microscope in micro-indentation testing apparatus with arrows pointing to the CW (white) and retracted plasma membrane (black). Scale bars are 100 $\unicode{x3bc} $ m. (d) Box and whiskers plot overlayed on initial cell stiffness data in each test condition. Each point in the plot represents an indentation test on a different cell ( $n\geq 6$ ).

We calculate the initial effective stiffness by a linear fit to the first 1 $\unicode{x3bc} $ m of indentation data after contact is initiated. This indentation depth is close to the thickness of the CW as measured from CLSM. Hence, the recorded mechanical response of the cell can be attributed to a combination of the CW and the underlying protoplasmic materials. In the plots of Figure 3d, the quantiles of each dataset are overlaid as a boxplot on the stiffness data. In Figure S3a, the empirical cumulative distribution functions (ECDFs) are shown, which enable the visualisation of the distribution of cell stiffness measurements across treatments.

The evident increase in stiffness observed in cells tested in a solution of lower osmotic pressure illustrates the dominant effects of turgor pressure, in comparison to all other effects under consideration. Specifically, we note two distinct groupings in the measured distributions: cells in GM suspensions ( $k_{\text {GM,all}}=8.95 \pm 0.86$ N/m), and cells in PS suspensions ( $k_{\text {PS,all}}=1.99 \pm 0.18$ N/m). The p-value which separates the stiffness of cells in GM and PS conditions is $p=7.22 \times 10^{-17}$ . BY-2 cell stiffness measurements previously reported in literature are in good agreement with the average cell stiffnesses shown in Figure 3d (Felekis et al., Reference Felekis, Weber, Muntwyler, Routier-Kierzkowska, Beyeler, Smith and Nelson2012; Weber et al., Reference Weber, Braybrook, Huflejt, Mosca, Routier-Kierzkowska and Smith2015). Specifically, stiffness ranges of 10–33 N/m were reported from (Felekis et al., Reference Felekis, Weber, Muntwyler, Routier-Kierzkowska, Beyeler, Smith and Nelson2012) for turgid cells, while back-calculated values of 10 and 5 N/m can be extracted from (Weber et al., Reference Weber, Braybrook, Huflejt, Mosca, Routier-Kierzkowska and Smith2015) for BY-2 cells in water and 0.2 M mannitol, respectively. The trend of turgor pressure increasing the stiffness of the cell is also reflected in measurements by (Weber et al., Reference Weber, Braybrook, Huflejt, Mosca, Routier-Kierzkowska and Smith2015). There was no statistically significant difference between any of the groups within the GM or PS categories.

The stiffness results support the dominance of turgor pressure on the cell stiffness, which is in agreement with our aforementioned AFM analysis, and literature (Routier-Kierzkowska et al., Reference Routier-Kierzkowska, Weber, Kochova, Felekis, Nelson, Kuhlemeier and Smith2012). Directly from the experimental results, we conclude that an increase in turgor pressure results in a dramatic increase in cell stiffness at multiple measurement scales. Beyond this conclusion, we aim to extract insights for the mechanical properties of other subcellular structures, especially the cytoskeletal filaments. Although there was no statistically significant difference between the measured stiffnesses of the cells in all the different treatments, we propose using a mechanical model to elucidate trends and effects caused by the different treatments on the mechanical contributions of sub-cellular components.

We apply a generalised two-spring model, which was introduced in our prior work (Roumeli et al., Reference Roumeli, Ginsberg, McDonald, Spigolon, Hendrickx, Ohtani, Demura, Ravichandran and Daraio2020), to separate the stiffness contributions from the CW and the protoplasm. In the two-spring model (Figure S4), the mechanical response of a cell to micro-indentation experiments is modeled as two springs acting in series. Previous literature reports modeled the mechanical response of a cell as a single spring by reporting apparent cell stiffness (Beauzamy et al., Reference Beauzamy, Derr and Boudaoud2015). In our model, the apparent cell stiffness is separated into contributions from the CW and protoplasm, using spring constants $k_{\text {CW}}$ and $k_{\text {prot}}$ , respectively.

(1) $$ \begin{align} k_{\text{total}} = \frac{k_{\text{CW}} k_{\text{prot}}}{k_{\text{CW}} + k_{\text{prot}}}. \end{align} $$

This simplified model of the cell response relies upon assumptions about the structure and materials that constitute the cell. The CW and protoplasmic materials are assumed to behave as homogeneous, isotropic, linear elastic materials at shallow indentation depths, and any nonlinear behaviours, such as viscosity, adhesion, or plasticity are not captured by the model. The stress in the cell away from the indenter is assumed to be negligible for shallow indentations (Boussinesq, Reference Boussinesq1885). The interpretation of stiffness with respect to subcellular structures is somewhat controversial due to the heterogeneity, directionality and variability inherent to biological systems.

2.4. Analysis of micro-indentation data

As a first iteration on the micro-indentation results, we assume that the CW stiffness remains constant across drug treatments, but not across osmotic solutions. This assumption is in accordance with the observation from our AFM data that changes in the CW elastic modulus caused by depolymerising MTs and removing AFs were much less significant than the change caused by different osmotic pressures. In the succeeding analysis section, which combines results from the AFM and micro-indentation experiments, we will remove this assumption, and analyse results from both experiments simultaneously.

An illustration of the spring model adapted to each test condition is presented in Figure S5. To extract the stiffness contributions from the MTs and AFs, we model them as springs in parallel to the rest of the protoplasmic response, with coefficients $k_{\text {MT}}$ and $k_{\text {AF}}$ . To account for the change in the protoplasm in different osmotic conditions, the protoplasmic response is differentiated between cells in GM and cells in PS. The GM is a hypotonic solution that allows the cell to maintain turgor pressure, nutrients to flow into the cell, and the cell to expand. The PS is a hypertonic solution since the osmotic pressure of a solution that causes plasmolysis (instant response visible through microscopic views of both mechanical testing methods, see Figure 1g–l, inset in Figures 2a and 3c) must be higher than the osmotic pressure of the cell. The spring constants $k_{\text {hypo}}$ and $k_{\text {hyper}}$ represent the stiffness contribution from all protoplasmic components in GM and PS, respectively, excluding the MTs and AFs, which are already represented by $k_{\text {AF}}$ and $k_{\text {MT}}$ in the spring model.

In total, we have six spring stiffnesses that are calculated though our analysis: $k_{\text {CW,hypo}}$ , $k_{\text {CW,hyper}}$ , $k_{\text {hypo}}$ , $k_{\text {hyper}}$ , $k_{\text {MT}}$ and $k_{\text {AF}}$ . We also have six measurements of the effective stiffnesses from the six testing conditions: GM, GM–MT, GM–AF, PS, PS–MT and PS–AF. Since we have an equal number of variables and datasets, a unique solution to the system of effective stiffness equations is possible. However, the equations are nonlinear and cannot be solved analytically. To tackle this, we develop a generative statistical model (Betancourt, Reference Betancourt2019; Bois, Reference Bois2018).

Generative statistical models are used to build a posterior probability distribution $g(\theta |y)$ , which is the probability that a set of parameters $\theta $ describes the given experimental data y. Here, we are interested in the posterior probability distribution for the parameters $\theta = \left \{ k_{\text {CW,hypo}}, k_{\text {CW,hyper}}, k_{\text {hypo}}, k_{\text {hyper}}, k_{\text {MT}}, k_{\text {AF}} \right \}$ given the dataset $y=\left \{ k_{\text {GM}}, k_{\text {GM-MT}}, k_{\text {GM-AF}}, k_{\text {PS}}, k_{\text {PS-MT}}, k_{\text {PS-AF}}\right \}$ , where each variable in y represents a set of measurements of the stiffness from the selected treatment. Thus, the posterior probability distribution details the probability that a set of deconvoluted subcellular stiffness constants describe the observed experiments. We use six separate posterior probability distributions, all of which are dependent on each other through the subcellular stiffness constants $\theta $ . Using Bayes’ theorem, we solve for $g(\theta |y)$ , using the likelihood of observing our experimental data given a selected set of parameters, $f(y | \theta )$ , and prior information about our parameters of interest, $g(\theta )$ . The likelihood is defined separately for each treatment using a Gaussian distribution, and the prior distribution is defined empirically (see Supplementary Materials).

We model the overall stiffness of each cell measured in each test condition using the two-spring model in Figure S4. Adaptations of equation (1) for each testing condition gives the relationship between the mean overall stiffness in each treatment ( $\unicode{x3bc} $ ) and the stiffness of each sub-cellular component (k). The equivalent equations for the spring stiffness are:

(2)
(3)
(4)
(5)
(6)
(7)

where the ratios R are all equal to 1 for this initial analysis, since we assume that the removal of MTs or AFs has no effect on the stiffness of the CW.

With these six equations, we transform the means of each of the six treatments to identify the six parameters of interest, $\theta = \left \{ k_{\text {CW,hypo}}, k_{\text {CW,hyper}}, k_{\text {hypo}}, k_{\text {hyper}}, k_{\text {MT}}, k_{\text {AF}} \right \}$ . To optimise the posterior distributions for all six parameters of interest simultaneously, we combine the six separate posterior distributions into one objective function and add six coefficients (a, b, c, d, e and f) that will be optimised concurrently. These six coefficients are used to balance the final objective function, in absence of finding the true solution to the system of six equations. Mathematically, we maximise F over a, b, c, d, e, f, and $\theta $ :

(8) $$ \begin{align} F &= a * g_{\text{GM}}(\theta|y) + b * g_{\text{GM-MT}}(\theta|y) + c * g_{\text{GM-AF}}(\theta|y) + d * g_{\text{PS}}(\theta|y)\nonumber \\ &\quad + e * g_{\text{PS-MT}}(\theta|y) + f * g_{\text{PS-AF}}(\theta|y). \end{align} $$

Projections of the objective function into two-dimensional space are presented in Figure S6, illustrating the correlations between each pair of the six stiffness parameters.

Coefficients a, b, c, d, e and f are weights multiplied in front of the posterior distributions for each of the six parameters of interest. The weights should all sum up to unity. We also add constraints on the size of the coefficients and the size of the spring constants to ensure that all components are included, and none dominate the optimisation function

(9) $$ \begin{align} a + b + c + d + e + f = 1, \end{align} $$
(10) $$ \begin{align} 0.05 \leq a, b, c, d, e, f \leq 0.5, \end{align} $$
(11) $$ \begin{align} 0.01 \leq \theta \leq 100. \end{align} $$

Using a trust-region constrained optimisation method, we can find the parameters $\theta $ that maximise the posterior distributions in all treatments, under the above constraints. We can also construct a credible region by calculating the Hessian at the optimised point in parameter space. The optimum parameter values (also known as the maximum a posteriori or MAP parameter values) and credible region (which contains approximately 68% of the total probability) are reported in the following discussion as $k_{\text {MAP}} \pm \sigma _{\text {MAP}}$ (mean $\pm $ standard deviation), and the results are visualised in Figure S6 as a red ‘x’ overlaying the projections of the combined posterior distributions.

By optimising the objective function from the combined posterior distributions, we can decouple the relative stiffness contributions from the six identified subcellular components of interest, and the results are in line with previous reports and predictions in literature (Cosgrove, Reference Cosgrove2016; Durand-Smet et al., Reference Durand-Smet, Chastrette, Guiroy, Richert, Berne-Dedieu, Szecsi, Boudaoud, Frachisse, Bendahmane, Hamant and Asnacios2014; Routier-Kierzkowska et al., Reference Routier-Kierzkowska, Weber, Kochova, Felekis, Nelson, Kuhlemeier and Smith2012). The contribution from the protoplasm without MTs and AFs in hypotonic conditions is the highest component evaluated ( $k_{\text {hypo}}=42.03 \pm 2.01$ N/m), and about four times greater than that of the protoplasm without MTs and AFs in hypertonic conditions ( $k_{\text {hyper}}=9.68 \pm 1.50$ N/m). This is in agreement with literature which shows that turgor pressure supplies most of the stiffness for turgid cells in compression (Routier-Kierzkowska et al., Reference Routier-Kierzkowska, Weber, Kochova, Felekis, Nelson, Kuhlemeier and Smith2012).

High turgor pressure in hypotonic conditions stresses the CW, making its response to compression appear stiffer. The stiffness of the CW from AFM indentations in GM was 5.5 times greater than the stiffness of the CW in PS. Without the inclusion of these results in the current analysis, the model predicts that the CW stiffness in hypotonic conditions ( $k_{\text {CW,hypo}}=12.43 \pm 0.68$ N/m) is about twice as high as the CW stiffness in hypertonic conditions ( $k_{\text {CW,hyper}}=6.95 \pm 0.32$ N/m). The results from this analysis represent both material and structure of the CW, while the AFM results probe only the CW material. The fact that both quantities are higher in GM than in PS could be merely a result of CW stiffening under high turgor pressure, or it could be a result of both CW strain-stiffening and an increase in the bending rigidity of the CW under a higher turgor pressure (or another unknown geometric or structural change in the cell under pressure).

The credible regions for the relative stiffness contribution from AFs ( $k_{\text {AF}}=11.81 \pm 4.69$ N/m) and MTs ( $k_{\text {MT}} = 6.82 \pm 2.48$ N/m) overlap, and are on the same order of magnitude as the CW stiffness. This result clearly demonstrates that the cytoskeleton is an important structural component for the cell.

2.5. Combined analysis of AFM and micro-indentation data

Literature results confirm that MTs and AFs are physically connected to the CW, and thus the removal of these filaments should affect the mechanical behaviour of the CW (Szymanski & Cosgrove, Reference Szymanski and Cosgrove2009). Our AFM experiments support this fact, as we measure that the CW stiffness is indeed affected by the removal of cytoskeletal filaments with drug treatments, albeit appreciably less than the effect of altering the osmotic pressure of the solution. In this part of our analysis, we introduce the observed effect of the drug treatments on the stiffness of the CW in our generative statistical model using ratios of the mean measured CW stiffnesses from the AFM tests. We calculate the CW stiffness values from the AFM data using a linear interpolation of the first 10% of the maximum force data after contact is detected. The use of ratios instead of absolute values of stiffness is selected to overcome discrepancies in measuring the same properties with different experimental techniques, which have also been reported in literature (Bidhendi & Geitmann, Reference Bidhendi and Geitmann2019; Wu et al., Reference Wu, Aroush, Asnacios, Chen, Dokukin, Doss, Durand-Smet, Ekpenyong, Guck, Guz, Janmey, Lee, Moore, Ott, Poh, Ros, Sander, Sokolov, Staunton and Wang2018).

Figure 4. (a) Contours of six-dimensional posterior distribution projected in two-dimensional space using modified stiffness equations to account for the change in CW stiffness from drug treatments, as observed in the AFM tests. Red ‘x’ marks the point which maximises the posterior distribution, known as the maximum a posteriori (MAP) estimate. The white lines represent 1, 2, 3 and 4 standard deviations from the center of the distribution. All stiffness units are N/m. (b) Comparison of stiffness values for the overall stiffnesses and each deconvoluted subcellular component in both analyses. From left to right, each bar represents: overall cell stiffness measured in hypotonic and hypertonic solutions with no added drug treatments (purple), deconvoluted CW stiffness in hypotonic and hypertonic solution (grey), deconvoluted stiffness from the cytosol, vacuole, and other organelles in hypotonic and hypertonic solution (blue), deconvoluted stiffness from actin filaments (AFs) (red) and deconvoluted stiffness from the microtubules (MTs) (green). The left and darker colored bars represent results from the analysis with AFM and micro-indentation results combined. The right and lighter colored bars represent results from the original analysis that only considered the micro-indentation data. Error bars represent standard deviation, so that the range covered by the error bars represents 68% of the total probability distribution for each stiffness.

The ratios used are:

(12) $$ \begin{align} R_{\text{GM-MT}} = \frac{k_{\text{AFM, GM-MT}}}{k_{\text{AFM, GM}}}, \end{align} $$
(13) $$ \begin{align} R_{\text{GM-AF}} = \frac{k_{\text{AFM, GM-AF}}}{k_{\text{AFM, GM}}}, \end{align} $$
(14) $$ \begin{align} R_{\text{PS-MT}} = \frac{k_{\text{AFM, PS-MT}}}{k_{\text{AFM, PS}}}, \end{align} $$
(15) $$ \begin{align} R_{\text{PS-AF}} = \frac{k_{\text{AFM, PS-AF}}}{k_{\text{AFM, PS}}}, \end{align} $$

where $k_{\text {AFM, treatment}}$ is the mean indentation stiffness measured in the specified treatment in AFM experiments. The use of these ratios allows us to introduce the change in CW stiffness, as observed in the AFM experiments, in the micro-indentation analysis, without adding additional parameters to optimise. Since the testing conditions are the same in both experiments, we assume that the ratios of mean CW stiffnesses are the same in both sets of experiments. The ratios presented in equations 1215 are substituted into equations 47 to produce the equivalent equations for spring stiffness which include the effect of removing cytoskeletal filaments on the CW stiffness. With these six equations, we can transform the means of each of the six treatments to identify the same six parameters of interest as in the initial analysis of the micro-indentation data, $\theta = \left \{ k_{\text {CW,hypo}}, k_{\text {CW,hyper}}, k_{\text {hypo}}, k_{\text {hyper}}, k_{\text {MT}}, k_{\text {AF}} \right \}$ . Again, we maximise the objective function from equation (8), F, over $\theta $ and the weighting coefficients a, b, c, d, e and f. Projections of the objective function into two-dimensional space using the modified spring stiffness equations is presented in Figure 4a. Using the same trust-region constrained optimisation method, we find the parameters that maximise the combined posterior distributions in all treatments, using the modified stiffness equations. These points are marked by a red ‘x’ in Figure 4a. The MAP parameter values and credible regions from both analysis methods are visualised in Figure 4b for comparison.

The results presented in Figure 4b confirm that the same trends hold true for results from both analyses. Firstly, in the combined analysis of the AFM and micro-compression experiments, the CW in hypotonic conditions ( $k_{\text {CW, hypo}} = 17.22 \pm 0.68$ N/m) is about twice as stiff as the CW in hypertonic conditions ( $k_{\text {CW, hyper}} = 8.27 \pm 1.40$ N/m), confirming the effective CW stiffening upon exertion of turgor pressure. This is 40 and 20% higher compared to our prior analysis, respectively for turgid and plasmolysed conditions. Secondly, the contribution from the protoplasm without MTs and AFs in hypotonic conditions is the highest component evaluated ( $k_{\text {hypo}} = 51.55 \pm 6.86$ N/m), and it is about five times greater than in hypertonic conditions ( $k_{\text {hyper}} = 9.02 \pm 4.78$ N/m). The protoplasmic stiffness without MTs and AFs in the hypotonic treatments is approximately 20% higher compared to our prior analysis, and in the hypertonic treatment the values are roughly the same in both analyses (approximately 7% difference). The MT stiffness ( $k_{\text {MT}}=15.16 \pm 1.96$ N/m) is nearly twice as high as the AF stiffness ( $k_{\text {AF}}=7.06 \pm 2.72$ N/m), which is the opposite of the trend observed in the previous analysis. The trend revealed in the present analysis is in agreement with literature, which reports that the rheological properties of Arabidopsis protoplasts with depolymerised MTs are significantly lower than those of untreated protoplasts, while AF removal does not significantly change the protoplast rheological properties (Durand-Smet et al., Reference Durand-Smet, Chastrette, Guiroy, Richert, Berne-Dedieu, Szecsi, Boudaoud, Frachisse, Bendahmane, Hamant and Asnacios2014). In our combined analysis, the effect of the cytoskeletal filaments on stiffness is more accurately captured, since the effect of the drug treatments on the CW is included. We note that our experiments are conducted in walled cells, while literature-reported results were obtained from wall-less protoplasts (Durand-Smet et al., Reference Durand-Smet, Chastrette, Guiroy, Richert, Berne-Dedieu, Szecsi, Boudaoud, Frachisse, Bendahmane, Hamant and Asnacios2014), which constitutes a significant difference amongst the two approaches. Nevertheless, we observe the same trend of higher stiffness contribution from MTs as compared to AFs, and, more importantly, that both those contributions are comparable to the CW stiffness.

Figure 5. Box and whiskers plot overlayed on energy dissipation data from cells in each test condition. Each point in the plot represents an indentation test on a different cell ( $n \leq 6$ ). Stars indicate significant differences in distributions according to the nonparametric Kolmogorov–Smirnov test. * $p<0.1$ , ** $p<0.05$ .

2.6. Analysis of dissipated energy

In order to evaluate the contributions of the subcellular elements on the dissipated energy during the micro-indentation tests, we calculate the area between the indentation and retraction curves in experiments reaching a force threshold of $800 \text { }\unicode{x3bc} $ N. This area represents the energy dissipated by the cell during the indentation experiment. The dissipated energies for cells in each treatment are presented with overlaid boxplots in Figure 5. To visualise the distribution of measurements, see the ECDFs of the dissipated energy data for cells in each treatment in Figure S3b. Similarly to our stiffness analyses, we find that the osmotic treatment results in the most dominant differences across all studied conditions. The two groups of cells in GM ( $W_{\text {GM,all}} = 1840 \pm 119 \text { N/m}^2$ ) and PS ( $W_{\text {PS,all}} = 736 \pm 177 \text { N/m}^2$ ) are significantly different with a p-value of $1.46\times 10^{-7}$ . Therefore, we conclude that turgor pressure affects not only the ability of the cell to store elastic energy, but also to dissipate energy.

The results show that in GM conditions the removal of MTs does not produce a detectable difference in the dissipated energy upon indentation. With turgor pressure removed, in PS conditions, the effects of MTs in providing dissipating energy modes to the cell are revealed. Upon removal of MTs, the average dissipated energy is reduced by a significant amount in the PS treatments, from is $W_{\text {PS}} = 1240 \pm 438 \text {N/m}^2$ in the pure PS treatment, to $W_{\text {PS-MT}} = 523 \pm 142 \text {N/m}^2$ in PS–MT treatment, with a corresponding p-value of 0.091. Literature reports show that MTs contribute to energy dissipation by buckling (Li, Reference Li2008; Soheilypour et al., Reference Soheilypour, Peyro, Peter and Mofrad2015).

The removal of AFs produces significantly different dissipated energies in both osmotic conditions. In particular, it leads to the highest average dissipated energy in GM conditions ( $W_{\text {GM-AF}} = 1940 \pm 59\, \text {N/m}^2$ ), and the lowest at PS conditions ( $W_{\text {PS-AF}} = 458 \pm 132\, \text {N/m}^2$ ). Those values are significantly separated from the dissipated energies of cells in pure GM and PS conditions by p-values of 0.012 and 0.024, respectively. Given that our results show that MTs contribute energy dissipation modes to the cell, we postulate that the removal of AFs causes an increase in the average dissipated energy in turgid cells by allowing more unrestricted movement and buckling of the MTs, since the two networks are interpenetrated in the protoplasm. This is in agreement with literature which shows that AFs act as a soft mesh that restricts MTs buckling under load in in vitro systems (Ricketts et al., Reference Ricketts, Ross and Robertson-Anderson2018). Finally, given that our results show that the removal of either AFs or MTs in plasmolysed cells causes a significant reduction of the dissipated energy in comparison to cells with intact MTs and AFs, we conclude that both MTs and AFs must contribute to the energy dissipation mechanisms of the cell.

3. Conclusions

In this work, we characterise the mechanical properties of Nicotiana tabacum cells, aiming to evaluate the distinct contributions from the CW, the protoplasm and the two main cytoskeletal components, MTs and AFs. We apply a multiscale biomechanical assay comprised of AFM and micro-indentation experiments, and test the cells in different osmotic solutions to control osmotic pressure, and in drug treatments that selectively remove either MTs or AFs. We then propose a generative statistical model that utilises stiffness measurements from the two independent experimental methods to deconvolute the relative contributions of the subcellular components to the cell stiffness. Using two sets of assumptions in our statistical model, our main conclusions are consistent, validating the model and the extracted trends.

Our results confirm that the cytoskeleton contributes significantly to the stiffness and dissipated energy of Nicotiana tabacum cells in indentation. Using the model which takes into account the contribution of MTs and AFs to CW stiffness, we find that the MT network contributes nearly double the amount of stiffness as the AF network, in agreement with studies in wall-less plant cell protoplasts (Durand-Smet et al., Reference Durand-Smet, Chastrette, Guiroy, Richert, Berne-Dedieu, Szecsi, Boudaoud, Frachisse, Bendahmane, Hamant and Asnacios2014). Moreover, we find that the removal of the cytoskeletal filaments causes significant reductions in the dissipated energy upon indentation. The results also confirm that turgor pressure is the dominant resisting component to compression. Furthermore, AFM results and our analysis of the micro-indentation tests confirm that the high internal pressure in hypotonic conditions stresses the CW, effectively stiffening it, as predicted in (Cosgrove, Reference Cosgrove2016).

4. Materials and methods

4.1. Cell cultures

A cell culture of Nicotiana tabacum Bright Yellow-2 (BY-2) was provided by the Leibniz Institute (DSMZ, Braunschweig, Germany). The cell suspensions were transferred in fresh media every 2 weeks. 50–300 ml cell aliquots in 100 ml to 1 L flasks were kept on a rotary shaker at 130 rpm at 23–25 $^\circ $ C. The growth media comprised of a Linsmaier & Skoog (LS) medium with vitamins (HIMEDIA- PT040) and 3% (w/v) sucrose at a pH of 5.8, supplemented with 1 $\unicode{x3bc} $ M 2,4-dichlorophenoxyacetic acid (2,4-D), 1 $\unicode{x3bc} $ M a-naphtaleneacetic acid, and 1.46 mM $\text {KH}_{2}\text {PO}_{4}$ . All chemicals were purchased from Sigma-Aldrich (St. Louis, MO). BY-2 marker lines expressing GFP-tubulin $\alpha $ that visualises MTs (GFP-BY2- $\alpha $ ), and GFP-AtFim1 to visualise AFs (GFP-BY2-F) were purchased (Riken BRC, Ibaraki, Japan) and cultured in modified Murashige and Skoog media (M0222, Goldbio, St. Louis, MO), supplemented with 0.2 mg/L 2,4-Dichlorophenoxy-acetic acid sodium salt monohydrate. These cultures were maintained on a rotary shaker at 130 rpm at $27^\circ $ C and transferred weekly in 95 ml aliquots with 3 ml transfer volume in 300 ml flasks. The marker lines were only used for visualisation of the effects of drug treatments on the cytoskeletal filaments.

4.2. Cell treatments

To study the effects of depolymerising AFs or MTs in hypotonic conditions, cells were extracted from culture and introduced in growth media solutions containing either 250 $\unicode{x3bc} $ M LatB or 50 $\unicode{x3bc} $ M oryzalin for 2 min. To study the same treatments in hypertonic conditions, 250 $\unicode{x3bc} $ M LatB or 50 $\unicode{x3bc} $ M oryzalin diluted in 1M sorbitol were used to treat the freshly extracted from culture cells for 2 min. Control experiments were conducted in LS growth media, while for the pure plasmolysis experiments without any additional drug treatments, cells were extracted from culture and immersed in 1M sorbitol solutions. In both cases, after 2 min of exposure the cells were subjected to the selected experiments. The immediate effects of plasmolysis after exposure to sorbitol treatments were observed with light microscopy and with the optical microscopes embedded with the mechanical testing setups (Figures 13). The immediate AF or MT network disruption after the short treatment times were suggested through study of the GFP-BY2 marker cells using CLSM. Specifically, we observed unstained GFP-BY2 cells after 2 min of incubation time in each treatment (Figure 1) and concluded that this exposure time is enough to disrupt their cytoskeleton but not enough to cause other observable effects in the protoplasm. For the AFM tests and micro-indentation tests, cells were extracted from their culture in normal media, treated for 2 min in each solution, and subsequently placed on coated glass substrates to be tested mechanically. Both types of mechanical testing were conducted immediately after the cells were placed on the substrate.

4.3. Microscopy observations

To measure the CW thickness, super-resolution images of wild-type BY-2 cells stained with calcofluor white 0.005% (w/v) were acquired on an LSM980 CLSM (Zeiss, Oberkochen, Germany) through the Airyscan 2 SR system. Cells extracted from culture were immersed in staining solution for 2 min, and imaged immediately. A 63 $\times $ oil immersion objective (NA = 1.46) was used, and Z-stack images were acquired with 0.13 $\unicode{x3bc} $ m step-size and $0.034 \times 0.034 \unicode{x3bc} $ m pixel-size. The Airyscan super resolution mode, coupled with a high NA objective allowed higher than diffraction-limited resolution in both $xy$ and z planes. The measurement module of Imaris 9.7 (Bitplane) was then used to measure the CW thickness on multiple z planes per cell ( $N=61$ ) (Figure S7). Unstained GFP-BY2 marker cells in normal growth media, after 2 min of incubation in media-based 250 $\unicode{x3bc} $ M LatB or 50 $\unicode{x3bc} $ M oryzalin solutions, were imaged observed under a CLSM (SP5 II, Leica Microsystems, Wetzlar, Germany) using a 63 $\times $ water immersion objective (NA 1.2) to acquire Z-stacks. Light microscopy observations using an AxioScope A1 (Zeiss, Oberkochen, Germany) allowed length and width measurements of the cells. All image analysis was carried out in ImageJ (http://rsb.info.nih.gov/ij/).

4.4. Mechanical testing

We tested the mechanical properties of the cells in two different osmotic conditions, in 1M sorbitol and in growth media, and in three drug treatments in conjunction with each osmotic condition, no added drug, 250 $\unicode{x3bc} $ M LatB or 50 $\unicode{x3bc} $ M oryzalin. Cells were exposed to each of the test solutions at maximum for 15 minutes. The micro-indentation tests were performed using a FT-MTA02 system equipped with FT-S1000-LAT (liquid design) sensing probes with a $50 \times 50\, \unicode{x3bc} \text {m}^2$ square tip (FemtoTools AG, Zurich, Switzerland) and an optical microscope. Data from indentations were position-corrected to account for contributions of the system stiffness. Microscope glass slides (AmScope, Irvine, CA) were cleaned with isopropyl alcohol, surface activated with a high-frequency generator for 2 minutes (BD-20A, Electro-Technic Products, Chicago, IL), and spin-coated with 0.5 ml poly-l-lysine (SUSS MicroTec, Garching, Germany). Cells extracted from culture and treatments were pipetted on the coated glass slides, washed several times with the selected treatment solution to effectively decluster them, and keep only those adhered to the substrate. One to three millilitres of the selected solution was added on top of the washed and diluted cells, and force-controlled indentations of up to 900 $\unicode{x3bc} $ N were conducted by immersing the sensing probe in liquid. The corresponding average indentation depth was $13.45 \pm 0.66 \text { } \unicode{x3bc} $ m (mean $\pm $ standard error). In the plots in Figures 3d and 5, each point corresponds to the indentation of an individual cell.

Short-range nano-indentations to evaluate the properties of the CW were conducted with AFM (Asylum Research, CypherES, Goleta, CA). For the AFM tests, we used custom tips with a silicon dioxide spherical particle (1 $\unicode{x3bc} $ m diameter) on a silicon cantilever with a stiffness of 16 N/m (Novascan, Boone, IA). Sample preparation was identical to that of the micro-indentation tests. We conducted force-controlled indentations to 15–70 nN and applied the Hertz model to calculate the indentation modulus, E, and a linear fit to calculate the initial stiffness of the cell wall, k. Each point in Figure 3d corresponds to an indentation test. We conducted multiple indentations for a given cell and tested a minimum of 5 cells.

4.5. Analysis

To subtract the sensor compliance, reference indentations on coated glass surfaces were conducted. The last 1 $\unicode{x3bc} $ m of indentation data is fit to a line, and the slope is taken to be the sensor stiffness, S. All micro-indentation experimental data on cells are then transformed by

(16) $$ \begin{align} \delta_{\text{corrected}} = \delta - \frac{F}{S}, \end{align} $$

where $\delta _{\text {corrected}}$ is the corrected indentation depth, $\delta $ is the measured indentation depth, and F is the measured force. We determine the initial point of contact using a force thresholding method (Routier-Kierzkowska et al., Reference Routier-Kierzkowska, Weber, Kochova, Felekis, Nelson, Kuhlemeier and Smith2012). The first 1 $\unicode{x3bc} $ m of filtered indentation data after the selected contact point are fit to a line, reported as the cell stiffness in that experiment, corresponding to one data point in Figure 3d. A Kolmogorov–Smirnov statistical test is used to compare the ECDFs of initial cell stiffness in each tested treatment. Sampling for the generative statistical modeling was performed using the Stan (Team, 2019) package within the Python programming language (https://www.python.org/). The optimisation to find the MAP parameters was performed using the SciPy (SciPy 1.0 Contributors et al., Reference Virtanen, Gommers, Oliphant, Haberland, Reddy, Cournapeau, Burovski, Peterson, Weckesser, Bright, van der Walt, Brett, Wilson, Millman, Mayorov, Nelson, Jones, Kern and van Mulbregt2020) optimisation package, which contains a function to implement the trust-region interior point method described by Byrd et al. (Byrd et al., Reference Byrd, Hribar and Nocedal1999). Visualisations were created using Altair (VanderPlas et al., Reference VanderPlas, Granger, Heer, Moritz, Wongsuphasawat, Satyanarayan, Lees, Timofeev, Welsh and Sievert2018).

AFM nano-indentation data was processed using Asylum Research software (AR 16.10.211) in Igor Pro 6.3. The software was used to identify the contact point and extract a Young’s modulus through the application of the Hertz contact model. The first 10% of the maximum force indentation data was fit to a line, and the average slopes ( $k_{\text {CW, GM}}$ , $k_{\text {CW, GM-MT}}$ , $k_{\text {CW, GM-AF}}$ , $k_{\text {CW, PS}}$ , $k_{\text {CW, PS-MT}}$ and $k_{\text {CW, PS-AF}}$ ) in each test condition are used in the ratios R in Equations (12)-(15).

Acknowledgements

The authors thank Dr. Wai Pang Chan for obtaining confocal microscopy images, Dr. Takato Imaizumi, Dr. Josep Vilarrasa-Blasi and Dr. Luca Bonanomi for the helpful discussions.

Financial support

This work was supported by the University of Washington (E.R.); and the Resnick Sustainability Institute at Caltech (C.D.).

Conflicts of interest

No conflicts of interest declared.

Authorship contributions

E.R., L.G. and C.D. conceived and designed the study. E.R., L.G., R.M., Q.L. and G.S. conducted data gathering. E.R. and R.H. maintained the cell lines. L.G. performed data analyses and statistical analyses. E.R. and L.G. wrote the article and all authors edited it.

Data availability statement

The data reported in this study are available from the corresponding author upon request, and the code will be shared on https://github.com/lginsberg3/single-cell-biomechanics after publication.

Supplementary Materials

To view supplementary material for this article, please visit http://doi.org/10.1017/qpb.2021.15.

References

Beauzamy, L., Derr, J., & Boudaoud, A. (2015). Quantifying hydrostatic pressure in plant cells by using indentation with an atomic force microscope. Biophysical Journal, 108, 24482456. https://doi.org/10.1016/j.bpj.2015.03.035 CrossRefGoogle ScholarPubMed
Betancourt, M. (2019). Probabilistic modeling and statistical inference [Betanalpha.github.io]. https://betanalpha.github.io/assets/case_studies/modeling_and_inference.html Google Scholar
Bidhendi, A. J., & Geitmann, A. (2019). Methods to quantify primary plant cell wall mechanics. Journal of Experimental Botany, 70, 36153648. https://doi.org/10.1093/jxb/erz281 CrossRefGoogle ScholarPubMed
Boussinesq, M. (1885). Application des potentiels. Gauthier-Villars.Google Scholar
Braybrook, S. A. (2015). Chapter 13—Measuring the elasticity of plant cells with atomic force microscopy. In Methods in cell biology (pp. 237254). Elsevier. https://doi.org/10.1016/bs.mcb.2014.10.006 Google Scholar
Burgert, I. (2006). Exploring the micromechanical design of plant cell walls. American Journal of Botany, 93, 13911401. https://doi.org/10.3732/ajb.93.10.1391 CrossRefGoogle ScholarPubMed
Byrd, R. H., Hribar, M. E., & Nocedal, J. (1999). An interior point algorithm for largescale nonlinear programming. SIAM Journal on Optimization, 9, 877900. https://doi.org/10.1137/S1052623497325107 CrossRefGoogle Scholar
Cosgrove, D. J. (2014). Re-constructing our models of cellulose and primary cell wall assembly. Current Opinion in Plant Biology, 22, 122131.CrossRefGoogle ScholarPubMed
Cosgrove, D. J. (2016). Plant cell wall extensibility: Connecting plant cell growth with cell 547 wall structure, mechanics, and the action of wall-modifying enzymes. Journal of Experimental Botany, 67, 463476. https://doi.org/10.1093/jxb/erv511 CrossRefGoogle Scholar
Čovanová, M., Sauer, M., Rychtář, J., Friml, J., Petrášek, J., & Zažímalová, E. (2013). Overexpression of the auxin binding PROTEIN1 modulates PIN-dependent auxin transport in tobacco cells. PLoS ONE, 8, e70050. https://doi.org/10.1371/journal.pone.0070050 CrossRefGoogle ScholarPubMed
Durand-Smet, P., Chastrette, N., Guiroy, A., Richert, A., Berne-Dedieu, A., Szecsi, J., Boudaoud, A., Frachisse, J.-M., Bendahmane, M., Hamant, O., & Asnacios, A. (2014). A comparative mechanical analysis of plant and animal cells reveals convergence across kingdoms. Biophysical Journal, 107, 22372244. https://doi.org/10.1016/j.bpj.2014.10.023 CrossRefGoogle ScholarPubMed
Durst, S., Hedde, P. N., Brochhausen, L., Nick, P., Nienhaus, G. U., & Maisch, J. (2014). Organization of perinuclear actin in live tobacco cells observed by PALM with optical sectioning. Journal of Plant Physiology, 171, 97108. https://doi.org/10.1016/j.jplph.2013.10.007 CrossRefGoogle ScholarPubMed
Felekis, D., Weber, A., Muntwyler, S., Routier-Kierzkowska, A.-L., Beyeler, F., Smith, R. S., & Nelson, B. J. (2012). Automated stiffness characterization of living tobacco by2 cells using the cellular force microscope. In 2012 IEEE International Conference on Automation Science and Engineering (CASE), pp. 285–290.CrossRefGoogle Scholar
Gardel, M. L., Kasza, K. E., Brangwynne, C. P., Liu, J., & Weitz, D. A. (2008). Chapter 19: Mechanical response of cytoskeletal networks. Biophysical tools for biologists, volume two: In vivo techniques (pp. 487519). Academic Press. https://doi.org/10.1016/S0091-679X(08)00619-5 CrossRefGoogle Scholar
Geitmann, A. (2006). Experimental approaches used to quantify physical parameters at cellular and subcellular levels. American Journal of Botany, 93, 13801390. https://doi.org/10.3732/ajb.93.10.1380 CrossRefGoogle ScholarPubMed
Huber, F., Boire, A., López, M. P., & Koenderink, G. H. (2015). Cytoskeletal crosstalk: When three different personalities team up [Cell architecture]. Current Opinion in Cell Biology, 32, 3947. https://doi.org/10.1016/j.ceb.2014.10.005 CrossRefGoogle Scholar
Janmey, P. A. (1991). Mechanical properties of cytoskeletal polymers. Current Opinion in Cell Biology, 3, 411. https://doi.org/10.1016/0955-0674(91)90159-V CrossRefGoogle ScholarPubMed
Janmey, P. A. (1998). The cytoskeleton and cell signaling: Component localization and mechanical coupling. Physiological Reviews, 78, 763781. https://doi.org/10.1152/physrev.1998.78.3.763 CrossRefGoogle ScholarPubMed
Li, T. (2008). A mechanics model of microtubule buckling in living cells. Journal of Biomechanics, 41, 17221729. https://doi.org/10.1016/j.jbiomech.2008.03.003 CrossRefGoogle ScholarPubMed
Maisch, J., Fišerová, J., Fischer, L., & Nick, P. (2009). Tobacco arp3 is localized to actinnucleating sites in vivo. Journal of Experimental Botany, 60, 603614. https://doi.org/10.1093/jxb/ern307 CrossRefGoogle ScholarPubMed
Milani, P., Braybrook, S. A., & Boudaoud, A. (2013). Shrinking the hammer: Micromechan ical approaches to morphogenesis. Journal of Experimental Botany, 64, 46514662. https://doi.org/10.1093/jxb/ert169 CrossRefGoogle Scholar
Moghaddam, P. R., & Wilman, D. (1998). Cell wall thickness and cell dimensions in plant parts of eight forage species. The Journal of Agricultural Science, 131, 5967.CrossRefGoogle Scholar
Moon, R. J.,Martini, A., Nairn, J., Simonsen, J., & Youngblood, J. (2011). Cellulose nanomaterials review: Structure, properties and nanocomposites. Chemical Society Reviews, 40, 3941. https://doi.org/10.1039/c0cs00108b CrossRefGoogle ScholarPubMed
Nelson, B. (2011). Quantifying growth mechanics of living, growing plant cells in situ using microrobotics. Micro & Nano Letters, 6, 311316.Google Scholar
Paredez, A. R., Somerville, C. R., & Ehrhardt, D. W. (2006). Visualization of cellulose synthase demonstrates functional association with microtubules. Science, 312, 14911495. https://doi.org/10.1126/science.1126551 CrossRefGoogle ScholarPubMed
Peaucelle, A., Braybrook, S. A., Le Guillou, L., Bron, E., Kuhlemeier, C., & Höfte, H. (2011). Pectin-induced changes in cell wall mechanics underlie organ initiation in arabidopsis. Current Biology, 21, 17201726. https://doi.org/10.1016/j.cub.2011.08.057 CrossRefGoogle ScholarPubMed
Pegoraro, A. F., Janmey, P., & Weitz, D. A. (2017). Mechanical properties of the cytoskeleton and cells. Cold Spring Harbor Perspectives in Biology, 9, a022038.CrossRefGoogle ScholarPubMed
Radotić, K., Roduit, C., Simonović, J., Hornitschek, P., Fankhauser, C., Mutavdžić, D., Steinbach, G., Dietler, G., & Kasas, S. (2012). Atomic force microscopy stiffness tomography on living Arabidopsis thaliana cells reveals the mechanical properties of surface and deep cell-wall layers during growth. Biophysical Journal, 103, 386394. https://doi.org/10.1016/j.bpj.2012.06.046 CrossRefGoogle ScholarPubMed
Ricketts, S. N., Ross, J. L., & Robertson-Anderson, R. M. (2018). Co-entangled actinmicrotubule composites exhibit tunable stiffness and power-law stress relaxation. Bio-physical Journal, 115, 10551067. https://doi.org/10.1016/j.bpj.2018.08.010 Google ScholarPubMed
Roumeli, E., Ginsberg, L., McDonald, R., Spigolon, G., Hendrickx, R., Ohtani, M., Demura, T., Ravichandran, G., & Daraio, C. (2020). Structure and biomechanics during xylem vessel transdifferentiation in Arabidopsis thaliana . Plants, 9, (issue 12), page 1715.CrossRefGoogle ScholarPubMed
Routier-Kierzkowska, A.-L., Weber, A., Kochova, P., Felekis, D., Nelson, B. J., Kuhlemeier, C., & Smith, R. S. (2012). Cellular force microscopy for in vivo measurements of plant tissue mechanics. Plant Physiology, 158, 15141522. https://doi.org/10.1104/pp.111.191460 CrossRefGoogle ScholarPubMed
Sampathkumar, A., Krupinski, P., Wightman, R., Milani, P., Berquand, A., Boudaoud, A., Hamant, O., Jönsson, H., & Meyerowitz, E. M. (2014). Subcellular and supracellular mechanical stress prescribes cytoskeleton behavior in Arabidopsis cotyledon pavement cells. eLife, 3, e01967. https://doi.org/10.7554/eLife.01967 CrossRefGoogle ScholarPubMed
SciPy 1.0 Contributors , Virtanen, P., Gommers, R., Oliphant, T. E., Haberland, M., Reddy, T., Cournapeau, D., Burovski, E., Peterson, P., Weckesser, W., Bright, J., van der Walt, S. J., Brett, M., Wilson, J., Millman, K. J., Mayorov, N., Nelson, A. R. J., Jones, E., Kern, R., … van Mulbregt, P. (2020). SciPy 1.0: Fundamental algorithms for scientific computing in python. Nature Methods, 17, 261272. https://doi.org/10.1038/s41592-019-0686-2 CrossRefGoogle ScholarPubMed
Sieberer, B. J., Kieft, H., Franssen-Verheijen, T., Emons, A. M. C., & Vos, J. W. (2009). Cell proliferation, cell shape, and microtubule and cellulose microfibril organization of tobacco BY-2 cells are not altered by exposure to near weightlessness in space. Planta, 230, 11291140. https://doi.org/10.1007/s00425-009-1010-7 CrossRefGoogle Scholar
Soheilypour, M., Peyro, M., Peter, S. J., & Mofrad, M. R. (2015). Buckling behavior of individual and bundled microtubules. Biophysical Journal, 108, 17181726. https://doi.org/10.1016/j.bpj.2015.01.030 CrossRefGoogle ScholarPubMed
Szymanski, D. B., & Cosgrove, D. J. (2009). Dynamic coordination of cytoskeletal and cell wall systems during plant cell morphogenesis. Current Biology, 19, R800R811. https://doi.org/10.1016/j.cub.2009.07.056 CrossRefGoogle ScholarPubMed
Team, S. D. (2019). Stan modeling language users guide and reference manual. https://mcstan.org Google Scholar
Tomos, A. D., & Leigh, R. A. (1999). The pressure probe: A versatile tool in plant cell physiology. Annual Review of Plant Biology, 50, 447472.CrossRefGoogle ScholarPubMed
VanderPlas, J., Granger, B., Heer, J., Moritz, D., Wongsuphasawat, K., Satyanarayan, A., Lees, E., Timofeev, I., Welsh, B., & Sievert, S. (2018). Altair: Interactive statistical visualizations for python. Journal of Open Source Software, 3, 1057. https://doi.org/10.21105/joss.01057 CrossRefGoogle Scholar
Vella, D., Ajdari, A., Vaziri, A., & Boudaoud, A. (2012). Indentation of ellipsoidal and cylindrical elastic shells. Physical Review Letters, 109, 144302.CrossRefGoogle ScholarPubMed
Vogler, H., Felekis, D., Nelson, B. J., & Grossniklaus, U. (2015). Measuring the mechanical properties of plant cell walls. Plants, 4, 167182. https://doi.org/10.3390/plants4020167 CrossRefGoogle ScholarPubMed
Weber, A., Braybrook, S., Huflejt, M., Mosca, G., Routier-Kierzkowska, A.-L., & Smith, R. S. (2015). Measuring the mechanical properties of plant cells by combining micro-indentation with osmotic treatments. Journal of Experimental Botany, 66, 32293241. https://doi.org/10.1093/jxb/erv135 CrossRefGoogle ScholarPubMed
Wu, P.-H., Aroush, D. R.-B., Asnacios, A., Chen, W.-C., Dokukin, M. E., Doss, B. L., Durand-Smet, P., Ekpenyong, A., Guck, J., Guz, N. V., Janmey, P. A., Lee, J. S. H., Moore, N. M., Ott, A., Poh, Y.-C., Ros, R., Sander, M., Sokolov, I., Staunton, J. R., Wang, , et al. (2018). A comparison of methods to assess cell mechanical properties. Nature Methods, 15, 491498.CrossRefGoogle ScholarPubMed
Yakubov, G. E., Bonilla, M. R., Chen, H., Doblin, M. S., Bacic, A., Gidley, M. J., & Stokes, J. R. (2016). Mapping nano-scale mechanical heterogeneity of primary plant cell walls. Journal of Experimental Botany, 67, 27992816. https://doi.org/10.1093/jxb/erw117 CrossRefGoogle ScholarPubMed
Yilmaz, N., Kodama, Y., & Numata, K. (2020). Revealing the architecture of the cell wall in living plant cells by bioimaging and enzymatic degradation. Biomacromolecules, 21, 95103. https://doi.org/10.1021/acs.biomac.9b00979 CrossRefGoogle ScholarPubMed
Figure 0

Figure 1. CLSM images on BY-2 marker lines to visualise the effects of short duration drug treatments on MTs and AFs. The model representation of MTs and AFs are included as insets in each image panel. (a)–(c) CLSM images of GFP-BY2-$\alpha $ cells in growth media-based solutions. White arrows point to larger bundles of MTs that are visible near the CW. (a) Fluorescence image in pure growth media. (b) Fluorescence image after exposure to growth media-based oryzalin solution. (c) Corresponding transmission light image for (b), showing no visual morphological change in the cell as a result of the short-term exposure to the drug treatment. (d)–(f) CLSM images of GFP-BY2-F cells in growth media-based solutions. Red arrows point to visible larger bundles of polymerised AFs. (d) Fluorescence image in pure growth media. (e) Fluorescence image after exposure to growth media-based LatB solution. (f) Corresponding transmission light image for (e), showing no evident morphological change in the cell as a result of the treatment. (g)–(i) CLSM images of GFP-BY2-$\alpha $ cells in sorbitol. (g) Fluorescence image. (h) Combined fluorescence and transmission light image of (g and i). (i) Transmission light image. (j)–(l) CLSM images of GFP-BY2-F cells in sorbitol. (j) Fluorescence image. Red arrows point to visible larger bundles of polymerised AFs. (k) Combined fluorescence and transmission light image of (j and l). (l) Transmission light image. In panels (h, i, k and l) white arrows point to CWs and black arrows point to plasma membranes, which have retracted from the CW. All scale bars are 20 $\unicode{x3bc} $m.

Figure 1

Figure 2. (a) Typical AFM force-indentation and retraction data from a cell in GM and in PS with Hertz fit to indentation data overlaid. Insets show corresponding images of cells in the AFM test in GM (left) and PS (right). Arrows point to CW (white) and retracted plasma membrane (black). Scale bars are 40 $\unicode{x3bc} $m. (b) Plot of indentation moduli for cells in all drug treatments in GM. (c) Plot of indentation moduli for cells in all drug treatments in PS. Note the difference in scales between (b) and (c). Each point in the plot represents an indentation test. In each test condition, there are $n \geq 9$ tests from five biological replicates. Stars indicate significant differences in distributions according to the nonparametric Kolmogorov–Smirnov test. ** $p<0.05$, *** $p<0.01$.

Figure 2

Figure 3. (a) Representative force-indentation and retraction data obtained in micro-indentation experiments on cells in GM (growth media) and in PS (plasmolysing solution). (b) Image of BY-2 cells in GM taken from optical microscope of the micro-indentation testing apparatus. (c) Image of BY-2 cells in PS taken from optical microscope in micro-indentation testing apparatus with arrows pointing to the CW (white) and retracted plasma membrane (black). Scale bars are 100 $\unicode{x3bc} $m. (d) Box and whiskers plot overlayed on initial cell stiffness data in each test condition. Each point in the plot represents an indentation test on a different cell ($n\geq 6$).

Figure 3

Figure 4. (a) Contours of six-dimensional posterior distribution projected in two-dimensional space using modified stiffness equations to account for the change in CW stiffness from drug treatments, as observed in the AFM tests. Red ‘x’ marks the point which maximises the posterior distribution, known as the maximum a posteriori (MAP) estimate. The white lines represent 1, 2, 3 and 4 standard deviations from the center of the distribution. All stiffness units are N/m. (b) Comparison of stiffness values for the overall stiffnesses and each deconvoluted subcellular component in both analyses. From left to right, each bar represents: overall cell stiffness measured in hypotonic and hypertonic solutions with no added drug treatments (purple), deconvoluted CW stiffness in hypotonic and hypertonic solution (grey), deconvoluted stiffness from the cytosol, vacuole, and other organelles in hypotonic and hypertonic solution (blue), deconvoluted stiffness from actin filaments (AFs) (red) and deconvoluted stiffness from the microtubules (MTs) (green). The left and darker colored bars represent results from the analysis with AFM and micro-indentation results combined. The right and lighter colored bars represent results from the original analysis that only considered the micro-indentation data. Error bars represent standard deviation, so that the range covered by the error bars represents 68% of the total probability distribution for each stiffness.

Figure 4

Figure 5. Box and whiskers plot overlayed on energy dissipation data from cells in each test condition. Each point in the plot represents an indentation test on a different cell ($n \leq 6$). Stars indicate significant differences in distributions according to the nonparametric Kolmogorov–Smirnov test. * $p<0.1$, ** $p<0.05$.

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Author comment: Cell wall and cytoskeletal contributions in single cell biomechanics of Nicotiana tabacum — R0/PR1

Comments

Dear Editors,

Please find enclosed the manuscript titled “Cell wall and cytoskeletal contributions in single cell biomechanics of Nicotiana tabacum” By L. Ginsberg, R. McDonald, Q. Lin, R. Hendrickx, G. Spigolon, G. Ravichandran, C. Daraio and E. Roumeli submitted for publication as an Original research article in Quantitative Plant Biology.

In this work, we investigate the contributions of the cell wall (CW), cytoskeleton and cytoplasm on the biomechanics of Nicotiana tabacum (bright yellow 2, BY2). We apply a multiscale biomechanical assay to single cells from a suspension culture. This assay includes nano-indentations through atomic force microscopy and micro-indentations through a micromechanical system. Based on our experimental results we propose a generative statistical model for the cell, which allows us to deconvolute the relative stiffness contributions from the CW, microtubules (MTs) and actin filaments (AFs) of the cytoskeleton and the (rest of the) cytoplasm. Our analysis provides evidence that the cytoskeleton significantly contributes to the mechanical response of BY2 cells in compression, while confirming that turgor pressure is the most significant contributor to the stiffness response of turgid cells under compression.

Our work aims to contribute to improving our fundamental understanding of the mechanical properties of plants at a cellular and sub-cellular level, and specifically, to elucidate the mechanical role of components connecting to the cell wall.

Thank you for considering our contribution. We look forward to hearing from you.

Sincerely,

Eleftheria Roumeli

Assistant Professor of Materials Science and Engineering

University of Washington

Review: Cell wall and cytoskeletal contributions in single cell biomechanics of Nicotiana tabacum — R0/PR2

Conflict of interest statement

Reviewer declares none.

Comments

Comments to Author: The purpose of the work presented here was to assess the contribution of the cytoskeleton on the stiffness of plant cells, in particular tobacco BY2 cells.

The authors present a comparison of two techniques for measuring forces in BY2 cells: the micro-compression of cells using a flat indenter, vs nano-indentation with AFM. Such a comparison as never been conducted and is interesting in itself. The authors performed measurements both on turgid or plasmolyzed cells, which provides an excellent entry point for comparing the techniques.

Despite these promising ideas, the realisation of this work and the data interpretation present important shortcomings. Before publication, the authors would have to address the following major issues:

1) Some of the results showing a statics difference between groups of data are not fully convincing. In Fig. 3B, it is evident that there are much less data points collected for the growth medium conditions (GM, about 10 data points) than for the other conditions (GM-MT and GM-AF, each about 30 data points). Moreover, the values reported for the GM conditions range between 1 and 11 MPa, while the range for GM-MT is quite similar (about 1 to 16 MPa). If there was as many data points for GM as for GM-MT, it is possible that their distributions would be similar.

The same issue occurred for other measurements (fig 5B, low number of data points for GM-MT and for PS-MT).

More data points should be collected in the cases mentioned above. If it occurred that the difference between conditions was not significant, a large portion of the manuscript should be re-writen (results, conclusions, abstract).

2) Turgid cells (in GM) present a very large range of young’s moduli (2 to 11 MPa) and stiffness values (2 to 21 N/m) (fig3 and fig5), which is quite in contradiction with previous literature. However, the authors do comment on this. It is possible that some of the cells are not fully turgid, which can happen if the growth medium evaporated during the experiments, leading to an increase in the GM osmotic potential and a decrease in the cell turgor pressure. For this reason, (Weber et al. 2015) monitored the osmolarity of the growth medium before/after experiments.

3) The authors report the cells to be stiffer when the microtubules are depolymerized (fig 5B). However, this counterintuitive result is not addressed.

4) There is only one short mention of (Weber et al 2015), which is very surprising, given how relevant Weber's work is to the present manuscript. Using FEM modeling, CFM and osmotic experiments, they showed the force measured with CFM in BY2 cells was proportional to the turgor pressure and to the cell radius. The authors should refer to Weber's paper (e.g. in the intro, circa line 66) and compare their experimental results and mechanical model in details (e.g. in the results, circa line 172).

5) The authors observe, as in other studies (e.g. Weber et al. 2015, Routier-Kierzkowska et al. 2012) a higher apprent stiffness of turgid cells compared to plasmolyzed ones. The only interpretation given by the authors is that the cell wall changes its mechanical properties under tension (e.g. line 280-281). However, a simpler explanation was already provided by the FEM models of Weber et al. 2012 and Routier-Kierzkowska et al. 2012, which reproduced this effect without introducing strain-stiffening properties to the cell wall. Generally speaking, a membrane or a shell under tension will appear stiffer, but that doesn't mean it is stiffening in response to stress. To make an analogy: the skin of a drum is harder to deform (i.e. it appears stiffer) as it is tightened (as the tension is increased), even if the skin itself keeps the same elastic modulus. The tension in a cell wall is caused by turgor pressure, but the principle is the same as in the case of the drum skin.

6) Similarly, AFM results can be interpreted without strain stiffening of the cell wall. The indentation depth of the AFM tip was about 20% of the depth of the cell wall (Line 128-130). Surely, this should be sufficient to bend the wall when indenting plasmolysed cells, as opposed to compressing the cell wall locally when indenting turgid cells. This could explain why plasmolyzed cells have a much lower young’s modulus than turgid ones.

Minor points:

1) Figure 2: I find the schematic representation confusing. In particular, why are MTs represented as more parallel to each other than AFs? This is not the case in the observations.

2) Line 118-119: I don't understand what the authors mean here and the supplementary material were not provided. Surely, the osmotic pressure of the growth medium (GM) should be lower than the one of the plasmolizing solution (PS)?

3) Line 169: “The evident increase in stiffness observed in cells tested in a solution of higher osmotic pressure”. It is the opposite: higher osmotic pressure of the solution = lower hydrostatic pressure of the cell = softer cell. For example, pure water has a null osmotic pressure, which induces a maximal hydrostatic pressure within the cell.

4) Fig. 5A: why use a different representation of the same data as in B? It is quite confusing and unecessary.

5) Fig. 5B: Why not show here the significance of the statics difference, as in fig. 3?

Review: Cell wall and cytoskeletal contributions in single cell biomechanics of Nicotiana tabacum — R0/PR3

Conflict of interest statement

Reviewer declares none.

Comments

Comments to Author: This paper addresses the role of turgor pressure, cytoskeletal elements and the cell wall itself in determining the mechanical properties of the plant cell wall. These interesting questions are highly relevant to those working on plant biomechanics and development given the mechanical nature of cell structure and expansion. The authors use a combination of indentation methods, pharmacological and osmotic treatments, and mathematical modelling to tease out the individual contributions to cell wall mechanics of different cellular components. As many measurement techniques give variable results across experiments, the authors attempt to bring together measurements across different scales providing a substantial contribution to the field.

The paper is generally very clearly written but there are a few areas in which I think the manuscript could be improved.

1. Cell wall thickness measurements are carried out here using Calcafluor staining and super-resolution confocal images and is relevant to understanding the extent to which indendations are likely to be influenced by turgor pressure. The method used is not particularly standard compared to other publications, however most methods of measuring cell wall thickness have issues. The measurements in the present manuscript (0.79um) are considerably higher compared to TEM measurements of BY-2 cells (0.1um) (Sabba et al., 1999 Int. J. Plant Sci. 160:275). It may be that fixatives during TEM sample preparation dehydrate the wall and give rise to this discrepancy, however, some studies have found increased wall thickness in TEM measurements compared to freeze-fractured SEM images that should preserve hydration. (see Derbyshire et al. 2007, J. Exp. Bot. 58:2079; Haas et al. 2020, Science, 367:1003). To help evaluate the validity of these measurements, it would be helpful to provide some example confocal images in which cell wall thickness was measured, and to provide some additional discussion of the potential limitations/variability in measurements of cell wall thickness.

2. The concentration of latrunculin B used (250uM) seems quite high (though admittedly treatment times are very short). Was there a rationale for this high concentration? In other publications with BY-2 cells, ranges of 0.1-10uM appear typical. There could also be a bit more explanation in the introduction of the effects that oryzalin and lat B have on the cytoskeleton and in general on plant cell/tissue function.

3. In AFM experiments, lat B treatment appears to substantially reduce stiffness in plasmolysed cells (fig 3). This seems surprising and there could be a little more discussion about the significance or interpretation of that result.

4. I am not qualified to assess the details of the statistical model that was constructed so will leave that to other reviewers but I found the explanation generally quite clear. I would suggest though that for the general reader additional explanation is given to help understand why two different models are constructed and the significance of the opposite results for the role of MTs versus actin in each model.

Minor points

5. Why are deeper indentations carried out on the plasmolysed cells – are they more reliable?

6. Sentence starting ‘The stiffness contributions’ in line 216 took me a while to understand. Perhaps it could be made a little clearer?

7. Mistake in line 220: kCW,hyper repeated twice

8. Line 252, ‘is’ should be ‘are’

9. Line 297, missing brackets

Recommendation: Cell wall and cytoskeletal contributions in single cell biomechanics of Nicotiana tabacum — R0/PR4

Comments

Comments to Author: Both the Reviewers found the problem addressed by this manuscript interesting and significant for biomechanics of plant cell. However, they also both found numerous issues that need to be addressed by the Authors before the manuscript can be accepted for publication. Please note that the Reviewers, having a different scientific background, point to different issues and therefore addressing all of them should improve this manuscript.

Decision: Cell wall and cytoskeletal contributions in single cell biomechanics of Nicotiana tabacum — R0/PR5

Comments

No accompanying comment.