Chemical composition and Raman spectroscopy under ambient conditions

The chemical composition of filatovite is quite simple (Table 2), the Al:As:Si atomic ratio is close to 2:1:1. The crystal under study does not contain impurities of divalent cations (e.g. Cu and Zn), which is in a good agreement with the previous studies of As-rich feldspar from the Arsenatnaya fumarole (Shchipalkina et al., Reference Shchipalkina, Pekov, Koshlyakova, Britvin, Zubkova, Varlamov and Sidorov2020b). Potassium is the main extra-framework cation (0.91 apfu), while sodium is present in very small amounts (0.03 apfu).

The Raman spectrum of filatovite under ambient conditions (Fig. 1a) is in a good agreement with the published data on the sanidine–filatovite solid-solution series (Shchipalkina et al., Reference Shchipalkina, Pekov, Britvin, Koshlyakova and Sidorov2020a). The Raman band positions of the sample in question are very close to those of a sanidine–filatovite solid solution, whereas the intensity ratio is significantly different. Though the intensity of the Raman bands often depends strongly on the crystal orientation, the framework crystal structure of filatovite with different orientations of all structural units allows us to exclude the orientation influence.

Figure 1. Raman spectra of filatovite (a) under ambient conditions; (b) at different temperatures from 70 to 1500 cm^–1; and (c) temperature evolution of 12 selected Raman bands. The errors are smaller than the size of the symbols.

In the sample studied, the three most intense bands with very close intensities are located in the region of 800–1000 cm^–1, which is usually attributed to the symmetric stretching modes of TO₄ tetrahedra. Based on literature data, the band at 863 cm^–1 is usually attributed to AsO₄ tetrahedra (e.g. Botto and Baran, Reference Botto and Baran1982; Vereshchagin et al., Reference Vereshchagin, Britvin, Perova, Brusnitsyn, Polekhovsky, Shilovskikh, Bocharov, van der Burgt, Cuchet and Meisser2019), whereas the bands at 985 and 994 cm^–1 are related to SiO₄ and AlO₄ tetrahedra (e.g. Dowty, Reference Dowty1987). The close intensities of the bands between 800 and 1000 cm^–1 can indicate a high amount of As in the sample being considered (e.g. ~Si:As ratio is 1:1), that is also confirmed by electron microprobe (see above) and SCXRD data (see below). In contrast, all the previously studied samples of the sanidine–filatovite solid-solution series with the maximum Si:Al ratio 1.61:0.63 have no intense band at ~863 cm^–1 (Shchipalkina et al., Reference Shchipalkina, Pekov, Britvin, Koshlyakova and Sidorov2020a). Weak bands in the region between 1000 and 1200 cm^–1 were also attributed to the asymmetric stretching modes of TO₄ tetrahedra, according to the calculations (Shchipalkina et al., Reference Shchipalkina, Pekov, Britvin, Koshlyakova and Sidorov2020a). The band at 1448 cm^–1 can be presumably assigned to an overtone or combination mode.

The next group of medium intense bands is located between 400 and 700 cm^–1, which were attributed to the ring breathing modes of four-membered rings of TO₄ tetrahedra (Shchipalkina et al., Reference Shchipalkina, Pekov, Britvin, Koshlyakova and Sidorov2020a). It should be noted that the most intense band of the sample within this group of bands studied in this work is located at 456 cm^–1, whereas in all the samples of sanidine–filatovite series studied previously, this band was less intense. The bands at 625 and 631 cm^–1 are mainly bending deformation of the tetrahedra, where the contribution of the aluminium to the vibration is predominant (Aliatis et al., Reference Aliatis, Lambruschi, Mantovani, Bersani, Ando, Gatta, Gentile, Salvioli-Mariani, Prencipe, Tribauldino and Lottici2015).

Another group of bands with frequencies below 400 cm^–1, responsible for the rotation–translation modes of four-membered rings and cage-shear modes, has no significant differences to the samples with a different Al:Si:As ratio (Shchipalkina et al., Reference Shchipalkina, Pekov, Britvin, Koshlyakova and Sidorov2020a).

Raman spectra evolution of filatovite upon heating

As the crystals of filatovite were small and the SCXRD study could not be performed at many temperatures, a high-temperature Raman spectroscopy study was undertaken for a quick evaluation of the high-temperature behaviour of filatovite, i.e. to determine the presence or absence of phase transformations. The evolution of 12 Raman bands upon heating was traced. Generally, all Raman bands moved to lower wavenumbers, i.e. underwent a red shift (Fig. 1c), which is typical for high-temperature conditions. Nevertheless, their shift speed was different: the bands in a low frequency number region (below 500 cm^–1) hardly changed their position across the whole temperature range, whereas the bands in a higher frequency number region, i.e. related to the deformations and vibrational stretching modes of TO₄ tetrahedra, moved significantly. At first glance, it could be seen that there were abrupt changes at ~200 and 300°C, but all these correspond to weak peaks and cannot be considered as structural changes. The disappearance of some peaks (ν₅, ν₁₀ and ν₁₁) refers to a general gradual deterioration of the Raman spectra upon heating (Fig. 1b).

Crystal structure evolution and thermal expansion of filatovite upon heating

The crystal structure of filatovite was refined at four temperature points (Tables 3 and 4) including ambient conditions. According to SCXRD data, the M site is occupied by K and Na with a 9:1 ratio, two of four T sites are fully occupied by Al, whereas the other two T sites are occupied by Si and As with a ratio close to 1:1 (e.g. the Al:Si:As ratio is 2:1:1). The bond lengths obtained are in a good agreement with the previous study of filatovite [our work vs Filatov et al., Reference Filatov, Krivovichev, Burns and Vergasova2004]: <T1–O> = 1.657 vs 1.634 Å; <T2–O> = 1.654 vs 1.634 Å; <Al1–O> = 1.753 vs 1.753 Å; <Al2–O> = 1.754 vs 1.754 Å; and <M–O> = 3.012 and 3.020 Å. Small differences in the tetrahedral bond length show there are slightly different Al:As:Si ratios in the crystals, which were studied by Filatov et al. (Reference Filatov, Krivovichev, Burns and Vergasova2004) (1.8:1.2:0.70) and in this work (~2:1:1), and that ^[4]Al > ^[4]As > ^[4]Si (ionic radii are 0.39, 0.34 and 0.26 Å, respectively; Shannon, Reference Shannon1976). The shorter Al–O bonds in the crystal structure we studied are explained by the absence of Zn (ionic radii are 0.39 and 0.6 Å for Al and Zn, respectively; Shannon, Reference Shannon1976).

Table 4. Bond distances in filatovite at different temperatures.

Attempts to refine the cation distribution by the sites at different temperatures lead to similar results at all temperatures, therefore they were fixed. This fact indicates the absence of the order–disorder process in the temperature range under consideration. Anisotropic displacement parameters were refined for all atoms at all temperatures.

As detailed above, filatovite belongs to minerals with feldspar topology (Krivovichev, Reference Krivovichev2020). Such crystal structures are described traditionally as consisting of so-called crankshaft chains of TO₄ tetrahedra (in our case – alternate corner-sharing AlO₄ and (Si,As)O₄ tetrahedra), formed by successive polymerisation of four-membered rings (Smith and Rinaldi, Reference Smith and Rinaldi1962; Smith, Reference Smith1978). Such crankshaft chains in the crystal structure of filatovite are elongated along the a axis, and join together to form a three-dimensional framework (Fig. 2).

Figure 2. Crystal structure of filatovite in different projections with averaged thermal expansion section (black parts of the sections demonstrate the negative thermal expansion). AlO₄ and (Si,As)O₄ tetrahedra are given in orange and yellow, respectively; M (M = K and Na) atoms are shown as black displacement ellipsoids. The program package Vesta (Momma and Izumi, Reference Momma and Izumi2011) was used for crystal structure visualisation.

The temperature dependencies of the unit cell parameters are shown in Fig. 3. As there are only four experimental points, it is not possible to determine the existence of any phase transformation based on this graph only. Nevertheless, the crystal structure refinement at all temperatures clearly indicates the absence of phase transitions.

Figure 3. Unit-cell parameters of filatovite at different temperatures. Errors are smaller than symbols.

Due to the small number of experimental points, the thermal expansion coefficients were only calculated with a linear approximation of the temperature dependencies of the unit-cell parameters: α₁₁ = 17.7(1), α₂₂ = –1.2(1), α₃₃ = 0(1), μ(α_11^a) = 19.7 (5), μ(α_33^c) = 6.2(5), α_a = 15.70(4), α_b = –1.2(1), α_c = 0(1), α_β = –1.8(5) and α_V = 16(1) × 10^–6 °C^–1. In other words, the thermal expansion of filatovite has an extremely anisotropic character up to negative, and close to zero, expansion along the b and c axes (Fig. 2). The direction of the maximal thermal expansion is close to the a axis, i.e. along the crankshaft chain of TO₄ tetrahedra. The TO₄ (T = Si and As) and AlO₄ tetrahedra remain rigid upon heating: the bond lengths vary within 3 standard error(s) upon heating up to 600°C (Table 4). This is consistent with the data of Dove et al. (Reference Dove, Cool, Palmer, Putnis, Salje and Winkler1993, Reference Dove, Pride and Keen2000) and Palmer et al. (Reference Palmer, Dove, Ibberson and Powell1997), which indicates the thermal stability of TO₄ (T = Si and Al) tetrahedra.

Though the crystal structure of filatovite does not undergo any polymorphic transformation, its deformation decreases. The two longest bonds (M–O1 and M–O3) in a MO₉ polyhedron decrease upon heating, whereas all other bond lengths increase as temperature increases (Table 4, Fig. 4). The (M–O) bond lengths change in the range of 0.013–0.078 Å (Table 4). In other words, the MO₉ polyhedron becomes more regular (less distorted) upon heating, which is also confirmed by the decrease of the polyhedron distortion index from 0.033 to 0.027 (calculated using the Vesta program package, Momma and Izumi, Reference Momma and Izumi2011).

Figure 4. Changes of the M–O bonds upon heating in (a) MO₉ polyhedra and (b) the MO₉ polyhedron in the ball-and-stick representation at 27°C and (c) 600°C. Red and purple ellipsoids show oxygen and M atoms, respectively.

It should also be noted that the direction of the maximal thermal expansion (α₁₁) is close to the direction of the minimal thermal vibration of the M cation regardless of temperature (Fig. 4b,c). A similar result was obtained previously for other alkaline feldspars (Filatov, Reference Filatov1990). This seemingly contradictory behaviour has been explained by the different nature of the factors determining thermal vibrations of atoms and thermal deformations of crystal structures (Filatov, Reference Filatov1990). Therefore, as it was mentioned above, the main factor determining the nature of thermal expansion of feldspar-related minerals is the crankshaft chain of TO₄ tetrahedra and the framework topology, and not the extra-framework cation.

As mentioned above, the filatovite heating products were X-ray amorphous at 800°C, whereas at 600°C the mineral preserved crystallinity. Feldspar-bearing mineral assemblages in the Arsenatnaya and Yadovitaya fumaroles (including the one where filatovite was found) are thought to form at temperatures above 500°C (Pekov et al., Reference Pekov, Koshlyakova, Zubkova, Lykova, Britvin, Yapaskurt, Agakhanov, Shchipalkina, Turchkova and Sidorov2018). The synthetic analogue of filatovite was crystallised from the amorphous stoichiometric phase K(Al₂AsSiO₈) at 650°C under atmospheric pressure (Kotelnikov et al., Reference Kotelnikov, Shchipalkina, Suk and Ananiev2019), which is consistent with our findings on the high temperature stability of filatovite. Thus, according to our investigation, we can conclude that the formation temperatures of this mineral is ~700 ± 50°C.