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Mapping Dielectric Properties with Torsionally Stabilized Nano Impedance Microscopy: Hard Materials to Biomolecules

Published online by Cambridge University Press:  28 October 2011

Kendra Kathan-Galipeau
Affiliation:
Nano/Bio Interface Center, The University of Pennsylvania, Philadelphia, PA 19104
Xi Chen
Affiliation:
Nano/Bio Interface Center, The University of Pennsylvania, Philadelphia, PA 19104
Bohdana Discher
Affiliation:
Nano/Bio Interface Center, The University of Pennsylvania, Philadelphia, PA 19104
Dawn A. Bonnell*
Affiliation:
Nano/Bio Interface Center, The University of Pennsylvania, Philadelphia, PA 19104

Extract

During the last twenty-five years of scanning tunneling microscopy (STM), atomic resolution has become routine in studies of a wide range of materials. While less routine, atomic force microscopy (AFM) also can achieve atomic resolution, even on insulating surfaces. These two microscopy approaches have significantly advanced our understanding of the surface physics and chemistry of many important phenomena. A significant contribution of scanning probe microscopy is that it can characterize local properties as well as structure. Surprising levels of spatial resolution have been achieved in scanning probes that can access continuum properties such as resistance, capacitance, etc..

Type
Scanning Probe Microscopy
Copyright
Copyright © Microscopy Society of America 2011

Introduction

During the last twenty-five years of scanning tunneling microscopy (STM), atomic resolution has become routine in studies of a wide range of materials. While less routine, atomic force microscopy (AFM) also can achieve atomic resolution, even on insulating surfaces. These two microscopy approaches have significantly advanced our understanding of the surface physics and chemistry of many important phenomena. A significant contribution of scanning probe microscopy is that it can characterize local properties as well as structure. Surprising levels of spatial resolution have been achieved in scanning probes that can access continuum properties such as resistance, capacitance, etc. [Reference Bonnell1, Reference Brukman and Bonnell2].

Recently there has been a focus on extending AFM to examine more complex properties, such as dielectric function and electromechanical coupling, while pushing the limits of spatial resolution of properties ever further. In this paper we describe a new scanning probe microscopy method that accesses local impedance, leading to information about dielectric function and polarization that can be applied to both hard and soft materials. Combining this with local laser excitation yields quantitative information about excited states and photo conduction.

Scanning Probes and Impedance

Most force-based scanning microscopes that probe electronic properties employ a conducting tip and the application of an electrical signal to the tip-surface junction. In some cases this is done with the probe tip in contact with the surface, yielding, for example, resistance, capacitance, and piezo-force microscopies. In other cases, the tip is above the surface leading to potentiometry and Kelvin probe microscopy. Introducing frequency variation into these local electrical measurements allows the access of increased information about the sample, in the present case dielectric function. Scanning Impedance Microscopy (SIM) can be done in non-contact mode, where the voltage modulation is across the sample of interest [Reference Kalinin and Bonnell3]. Alternatively, it can be done in contact or near contact mode, which is analogous to macroscopic impedance spectroscopy and is referred to as nano impedance microscopy/spectroscopy (NIM/NIS) [Reference Shao, Kalinin and Bonnell4, Reference Feng, Nix and Prinz5].

Impedance spectroscopy has long been recognized as one of the major techniques for the characterization of AC transport in materials. Impedance is defined as the ratio of the AC voltage excitation to a current response: Z(ω) = V(ω)/I(ω). Impedance, Z, is usually expressed in complex form in terms of its modulus, |Z|, and phase, θ, as Z = |Z| e . Capacitance, resistance, and associated frequency dependence of the impedance depend on the material properties. Typical applications of impedance spectroscopy are to differentiate grain boundary, grain interior, and electrode impedances by fitting the data to corresponding equivalent circuit models [Reference Kalinin and Bonnell6]. However, the general limitation of all macroscopic techniques is that only average transport properties are determined. The first SPM techniques for accessing AC transport behavior were SIM [Reference Kalinin and Bonnell3, Reference Shao, Kalinin and Bonnell4, Reference Kalinin and Bonnell6, Reference Bonnell7, Reference Buss, Evans, Liu, Shang, Oliphant, Schultz and Hawkin8, Reference Shin, Meunier, Baddorf and Kalinin9, Reference Kalinin, Shao and Bonnell10, Reference Kalinin, Bonnell, Freitag and Johnson11] and NIM [Reference Shao, Kalinin and Bonnell4, Reference Bonnell7]. Strategies to enhance the sensitivity of these measurements have been suggested [Reference Shao, Kalinin and Bonnell4, Reference Pingree, Martin, Schull and Hersam12, Reference Pingree and Hersam13, Reference Pingree, Russell, Scott, Marks and Hersam14, Reference Rodriguez, Jesse, Seal, Baddorf and Kalinin15, Reference Fumagalli, Ferrari, Sampietro, Casuso, Martinez, Samitier and Gomila16, Reference Fumagalli, Ferrari, Sampietro and Gomila17, Reference Fumagalli, Ferrari, Sampietro and Gomila18, Reference Kathan-Galipeau, Nanayakkara, Nikiforov, O'Brien, Discher and Bonnell19].

These approaches are facilitating examinations of a range of material systems and devices. A limitation, however, is that they cannot be applied to soft surfaces, such as organic or biomolecular monolayers. The challenges are to control the tip-surface force so as not to damage the surface, to detect very small signals, and to eliminate the contributions from stray capacitances. This is accomplished in torsionally stabilized nano impedance microscopy (TR-NIM), where we introduce sample-tip laser excitation to increase the property information content.

Torsionally Stabilized Nano Impedance Microscopy

Torsional resonance is employed to control the sample-tip force interaction and topographic imaging, enabling near-field contact with the lowest possible force (10 nN). In torsional mode, the probe is oscillated along the cantilever's long axis, creating a rotational oscillation. An impedance measurement system is designed to: operate at very low currents typical for SAMs (<1 pA), operate over a significant frequency range (kHz to 100 kHz) to increase signal-to-noise ratios, and compensate for system stray capacitances.

Figure 1 illustrates a schematic diagram of the TR-NIM configuration. The tip is maintained in proximity of the sample surface by the microscope controller. The electrical impedance of tip-surface junction is measured using external circuitry consisting of a current amplifier, signal generator, and lock-in amplifier. Tunneling currents across biological molecules are quite small; to measure this current, a high-speed, high-gain current amplifier is required. The signal generator and current amplifier have a common ground. A reference signal is fed into the lock-in amplifier for synchronization of signal generator and lock-in amplifier. The signal from the amplifier is summed with the compensating signal to account for the capacitance of the entire system. This then enters the lock-in amplifier. The output of the lock-in amplifier is fed into the microscope controller for analysis. The spatial resolution can be estimated to be about 20 nm. The resolution of capacitance is 2 aF.

Figure 1: Torsional resonance nanoimpedance microscopy (TR-NIM) schematic diagram (a). An AC bias is applied to the tip/sample, and the alteration in this signal due to the impedance of the sample is output to the amplifier. The signal from the amplifier is summed with the compensating signal to account for the capacitance of the entire system. This combined signal then enters the lock-in amplifier. The output of the lock-in is fed into the microscope controller for analysis. (b) Schematic illustration of the tip-surface junction allowing photo excitation of patterned protein layers. (b) is from Kathan-Galipeau et al., ACS Nano 4835, copyright 2011, with permission of ACS.

The total impedance can be modeled as the impedance due to capacitive coupling, which is the impedance due to the system and the impedance of the sample. Given the film size and properties, a significant contribution to the signal is noise from the system's capacitive coupling. There is capacitive coupling related to the cantilever, cantilever holder, and other structural components of the AFM. Therefore, the nulling signal is used to account for most of the effect of these other signals. It is assumed that the impedances of the graphite and sample are in parallel.

Assuming the molecule can be represented as an RC circuit [Reference Plant, Gueguetchkeri and Yap20],

(1)

$$
R = {{10\sqrt 2 VG} \over {sX}}
$$

and

(2)

$$
C = {{sY} \over {10\sqrt 2 VG\omega }}
$$

where R = resistance, C = capacitance, V = applied voltage, ω = frequency, s = sensitivity of lock-in amplifier, G = gain of current amplifier, and X and Y = output of lock-in amplifier. ( 
$\sqrt 2$
is required because V o is an RMS voltage; 10 is a conversion factor within the lock-in amplifier.) The values for X and Y are relative to that of the graphite. If the compensating signal is perfect, we measure zero impedance over graphite. The change in impedance is then entirely attributed to the molecule.

Materials and Methods

For TR-NIM experiments, a platinum-iridium coated tip was used; f o = 146–236 kHz and k = 21–98 N/m (Nanosensors). The AFM instrumentation was performed on a Veeco Dimension 3100 with a IVa controller. Two current amplifiers were used, which together provide a gain range of 1 × 102 – 1 × 1011 V/A (Femto DLPCA-200, DHPCA-100) Two lock-in amplifiers provided a frequency range from 1 mHz–200 MHz (SRS830, SRS844). The AC signal can be applied in a range from 1 μHz to 30 MHz (SRS DS345). The sum box has a range from 0.002–60 MHz (Mini-Circuits ZSC-2-2).

TR-NIM on Hard Materials

To demonstrate the effectiveness of TR-NIM for probing dielectric behavior, Figure 2 shows a typical TR-NIM image of CdTe. Figure 2 shows the topography, amplitude, and phase of impedance (left to right). At 70 kHz, the resistance is 8035 kΩ, and the capacitance is 21.3 fF. A dielectric constant of 10.1 was determined from these images, assuming 1 mm thick CdTe and a 8.7 nm tip size. In comparison, the literature value of the dielectric constant of CdTe is 10.9 [Reference De Nobel and Hofman21]. This agreement provides confirmation of the effectiveness of TR-NIM for determining the dielectric constant of materials.

Figure 2: TR-NIM image of CdTe ⟨0001⟩ topography, amplitude, and phase of impedance (left to right). Height z-range = 15 nm, amplitude range = 80 mV, phase range = 120 mV. Parameters: 70 kHz, 0.5 V applied signal, gain = 109, sensitivity = 5 mV. Platinum-iridium coated cantilevers were used with the following properties: resonant frequency = 146–236 kHz, spring constant = 21–98 N/m, and tip radius ~ 40 nm.

TR-NIM on Soft Materials: Biomolecules Toward Protein-Based Circuits

Recently, the appreciation of the high energy yield and quantum efficiencies of a number of natural photo-activated proteins, in the context of a decade of research on molecular electronics, has raised the possibility of new nanoelectronic device applications. Bio-based strategies for light-activated electron pumps, solar cells, chemical sensors, and optoelectronics have been suggested. An obvious challenge is to understand and control the properties of the proteins when attached to electrodes and configured in the ambient environments relevant to potential device architectures. Despite the challenges of characterizing biomolecule interfaces that are a consequence of the delicate nature of the structure, probing a complex property such as impedance would provide valuable insight.

The application of TR-NIM is illustrated here to determine the resistance, capacitance, and dielectric properties of novel optically active biomolecules [Reference Kathan-Galipeau, Nanayakkara, Nikiforov, O'Brien, Discher and Bonnell19]. These molecules consist of tetramers of alpha helix polypeptides and provide a convenient functional alternative to natural proteins. We recently studied the behavior of zinc protoporphyrin IX (ZnPP) [Reference Kathan-Galipeau, Nanayakkara, Nikiforov, O'Brien, Discher and Bonnell19]. To determine the behavior of these functional biomolecules on electrodes, microcontact printing was used to create stripes that alternate between ZnPP maquettes and bare graphite. Understanding the dielectric constant is of particular interest because it gives information about the polarizability of these molecules. With a view toward understanding the behavior of future devices, optoelectronic properties of the biomolecules should be probed. This can be accomplished by combining TR-NIM with in-situ laser excitation.

Idealized protein-electrode junction devices can be fabricated by microcontact printing self-assembled layers of proteins in patterns on atomically smooth highly oriented pyrolytic graphite (HOPG) [Reference Kane, Takayama, Ostuni, Ingber and Whitesides22]. The first layer of these engineered amphiphilic proteins will orient on the hydrophobic graphite with the hydrophobic domain nearest the graphite due to hydrophobic interactions. Figure 3 presents a typical spatially resolved impedance measurement [Reference Kathan-Galipeau, Nanayakkara, Nikiforov, O'Brien, Discher and Bonnell19]. The topographic structure shown in Figures 3a and 3b are typical of a protein-patterned electrode, in this case with a pattern pitch of 1 μm and protein lines varying in height from 6–20 nm. Many regions of the patterns exhibit heights very close to 6.6 nm, the length of a single 4-helix bundle. These regions, in which the orientation of the molecule with respect to the substrate can be assigned, are identified by height profiles in the range of 6.6 ± 0.5 nm, and the impedance is analyzed. Figure 3c identifies several such regions. The component of the impedance related to resistance is mapped in 3d, and the component related to capacitance is mapped in 3e. Measurements made during laser excitation with 425 nm light were similar to Figures 3d and 3e but differed in magnitude.

Figure 3: Proteins patterned on an electrode. ZnPP maquettes, 20 μL, 30 μM, 15 s stamping time. (a) topography, (b) zoomed in area of box in (a), (c) profiles of various areas of ZnPP maquettes. The first line profile corresponds to the line in image (b). Red arrows indicate regions of ~6.6 nm, which are one monolayer in height. (d) x-component of impedance of area in (b), (e) y-component of impedance in (b). x and y z-range = 125 mV, height z-range = 90 nm in (a) and 40 nm in (b). 70 kHz, 0.5 V applied signal. Kathan-Galipeau et al., ACS Nano 4835, copyright 2011, with permission of ACS.

Figure 4 compares several hundred values of the resistance (a) and capacitance (b) in a region of the ZnPP monolayer with and without laser excitation. This type of analysis enables conclusions to be drawn from small signals with statistical significance. In this case the reduction of resistance and increase in capacitance in the presence of the laser illumination is clear. For these proteins the electronic transport mechanisms are complex, but the capacitance differences can be understood in terms of the polarization in the porphyrin complexes within the protein. The dielectric constant determined from capacitance can be related to the polarization volume in the molecule. When the light is absorbed, the excited electron resides in a more delocalized orbital. The difference in the delocalization and the degree of coupling between the porphyrins can be compared from these measurements.

Figure 4: The effect of laser optical illumination on the resistance (a) and capacitance (b) of monolayer ZnPP maquettes illustrated as 2D and 3D histograms of the properties. The top 3D histograms in the insets are the properties with illumination, the bottom without illumination. Red curves in the 2D histograms are with illumination; black curves are without exposure. l = 425 nm. Kathan-Galipeau et al., ACS Nano 4835, copyright 2011, with permission of ACS.

Summary

The examples presented illustrate how TR-NIM can be used to determine properties of hard and soft materials. It is an advance over earlier probe-based impedance imaging in that it can characterize soft materials such as organic monolayers and engineered proteins. The approach opens a pathway to bringing frequency and time-dependent probes to bear on questions of the behavior of complex molecules, such as proteins. Accessing the real and imaginary components of properties adds a new dimension of information at the local scale that will be valuable in the development of hybrid devices.

Acknowledgments

This research was supported by the Nano/Bio Interface Center through the National Science Foundation NSEC DMR08-32802

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Figure 0

Figure 1: Torsional resonance nanoimpedance microscopy (TR-NIM) schematic diagram (a). An AC bias is applied to the tip/sample, and the alteration in this signal due to the impedance of the sample is output to the amplifier. The signal from the amplifier is summed with the compensating signal to account for the capacitance of the entire system. This combined signal then enters the lock-in amplifier. The output of the lock-in is fed into the microscope controller for analysis. (b) Schematic illustration of the tip-surface junction allowing photo excitation of patterned protein layers. (b) is from Kathan-Galipeau et al., ACS Nano 4835, copyright 2011, with permission of ACS.

Figure 1

Figure 2: TR-NIM image of CdTe ⟨0001⟩ topography, amplitude, and phase of impedance (left to right). Height z-range = 15 nm, amplitude range = 80 mV, phase range = 120 mV. Parameters: 70 kHz, 0.5 V applied signal, gain = 109, sensitivity = 5 mV. Platinum-iridium coated cantilevers were used with the following properties: resonant frequency = 146–236 kHz, spring constant = 21–98 N/m, and tip radius ~ 40 nm.

Figure 2

Figure 3: Proteins patterned on an electrode. ZnPP maquettes, 20 μL, 30 μM, 15 s stamping time. (a) topography, (b) zoomed in area of box in (a), (c) profiles of various areas of ZnPP maquettes. The first line profile corresponds to the line in image (b). Red arrows indicate regions of ~6.6 nm, which are one monolayer in height. (d) x-component of impedance of area in (b), (e) y-component of impedance in (b). x and y z-range = 125 mV, height z-range = 90 nm in (a) and 40 nm in (b). 70 kHz, 0.5 V applied signal. Kathan-Galipeau et al., ACS Nano 4835, copyright 2011, with permission of ACS.

Figure 3

Figure 4: The effect of laser optical illumination on the resistance (a) and capacitance (b) of monolayer ZnPP maquettes illustrated as 2D and 3D histograms of the properties. The top 3D histograms in the insets are the properties with illumination, the bottom without illumination. Red curves in the 2D histograms are with illumination; black curves are without exposure. l = 425 nm. Kathan-Galipeau et al., ACS Nano 4835, copyright 2011, with permission of ACS.