The title structure is a new modification of Tl2CrO4. There are four independent Tl+ cations and two [CrO4]2− anions in the structure. It is closely related to the already known modification, which belongs to the β-K2SO4 family with two independent cations and one anion. In both modifications, the cations and anions are situated on crystallographic mirror planes. The volume of the asymmetric unit of the title structure is ∼0.4% smaller than that of the known modification belonging to the β-K2SO4 family. The other difference between the two modifications is seen in the environment of the cations. In the title structure, none of the Tl+ cations is underbonded, in contrast with the modification isostructural with β-K2SO4. In the β-K2SO4 family with simple cations, underbonding of one of the constituent cations is typical. The dependence of the unit-cell parameters on temperature does not indicate a phase transition in the interval 90–300 K.
Supporting information
Tl2CrO4 cannot be prepared by simply mixing aqueous solutions of suitable
salts, since it is scarcely soluble: Kp = 8.67 × 10-13
(CRC Handbook of Chemistry and Physics, 2009). The title
structure was
prepared by a similar procedure to that described by Carter & Margulis
(1972),
although they used silica gel, which is different to the present preparation.
The title crystals were prepared by the reaction of TlNO3, previously
dispersed in a gel formed by hydrolysis of tetramethoxysilane, with
K2CrO4, as follows. TlNO3 (0.5 g) was dissolved in H2O (20 ml) at room
temperature. After 1 h, H2O (27.5 ml) was added together with
tetramethoxysilane (2.5 ml). The mixture was stirred for 70 min and then
distributed into seven test tubes. The mixtures were left for 2 d until a firm
gel formed. A solution of K2CrO4 (0.185 g) in H2O (25 ml) was then
prepared, i.e. in the approximate overall molar ratio of 2:1 for
TlNO3 and K2CrO4. A small quantity (about 3 ml) of this solution was
introduced into each test tube in which the title crystals were to be grown.
During the growth of the crystals, Liesegang rings developed: on the front of
the precipitation zone the gel was yellow, while behind it a had an orange
tint. Crystals of two shapes and colours could be distinguished, namely one
type that formed tiny cubes with a more intense orange colour and the other
forming needle or plate-like crystals that were yellowish. However, the
diffraction patterns of either sample were the same. After four months,
crystals were selected manually from the gel. Calorimetric measurements the
indicated possible presence of the β-K2SO4 polymorph.
The differential scanning calorimetric experiments were performed using a
Perkin–Elmer DSC 7 instrument for the measurements from 93 to 323 K and a
Perkin–Elmer Pyris Diamond instrument for the measurements from 298 to 823 K
(scanning rate 10 K min-1, sample mass 17 mg, Al pans 40 µl). PYRIS
software (Perkin–Elmer, 2001) was used for control and evaluation. A
reversible phase transition was found at 783 K on heating and 777 K on cooling
(enthalpy change 4.0 J g-1). This is in good agreement with the phase
transitions observed for the β-K2SO4 polymorph of Tl2CrO4 by
differential thermal analysis at 795 K on heating and 774 K on cooling
(Natarajan & Secco, 1974).
Two refined models were used, one with all atoms independent (79 parameters
refined and with slightly lower refinement indicators: Robs = 0.0324,
wRobs = 0.0777, Rall = 0.0804, wRall = 0.0841,
Sobs = 1.22 and Sall = 0.93; otherwise, the refinement
conditions were the same), and the other where the atomic parameters were
constrained in such a way that the independent chromates in the two positions
were assumed to be identical, i.e. the atomic parameters of the
reference chromate situated on the mirror plane were refined. Further refined
parameters of the chromate were the rotation and the displacement parameters
of the molecules in each site, in order to localize their true positions. Some
rotations, however, were excluded, in order to respect the localization of the
chromates on the crystallographic mirror planes, i.e. only the rotation
whose axis is parallel to the y axis was released. (The rotation of the
A chromate about the axis parallel to y was excluded for
computational reasons.) Also, the possible translations were limited beacuse
of the presence of the mirror plane. (For further details, see the refinement
instruction file in the archived CIF.) The latter model, with the assumed
identical independent chromates, was given preference, because the
displacement parameters of some O atoms seemed to be more probable and the
lowering of the refinement indicators was negligible with respect to the
decrease of 24 in the number of refined parameters. The maximum residual
electron-density peak (2.43 eÅ-3) is situated 0.2872 (11) Å from
Tl3(x, y, z), while the minimum electron density (-2.71
eÅ-3) is situated 1.2728 (12) Å from Tl2(x - 1/2, y - 1/2,
z).
Data collection: CrysAlis PRO (Oxford Diffraction, 2009); cell refinement: CrysAlis PRO (Oxford Diffraction, 2009); data reduction: CrysAlis PRO (Oxford Diffraction, 2009); program(s) used to solve structure: SIR97 (Altomare et al., 1999); program(s) used to refine structure: JANA2006 (Petříček et al., 2006); molecular graphics: PLATON (Spek, 2009); software used to prepare material for publication: JANA2006 (Petříček et al., 2006).
Crystal data top
| Tl2CrO4 | F(000) = 1744 |
| Mr = 524.8 | Dx = 6.975 Mg m−3 |
| Monoclinic, C2/m | Mo Kα radiation, λ = 0.71073 Å |
| Hall symbol: -C 2y | Cell parameters from 2300 reflections |
| a = 12.7458 (8) Å | θ = 3.0–26.5° |
| b = 5.8070 (3) Å | µ = 66.39 mm−1 |
| c = 14.721 (1) Å | T = 292 K |
| β = 113.519 (7)° | Needle, yellow |
| V = 999.06 (12) Å3 | 0.25 × 0.03 × 0.03 mm |
| Z = 8 | |
Data collection top
Oxford Gemini
diffractometer | 1363 independent reflections |
| Radiation source: Enhance (Mo) X-ray Source | 710 reflections with I > 3σ(I) |
| Graphite monochromator | Rint = 0.063 |
| Detector resolution: 10.3784 pixels mm-1 | θmax = 29.1°, θmin = 3.0° |
| Rotation method data acquisition using ω scans | h = −16→15 |
Absorption correction: analytical
[CrysAlis PRO (Oxford Diffraction, 2009), analytical numerical
absorption
correction using a multifaceted crystal model (Clark & Reid, 1995); it
seemed that one part of the sample did not diffract well and the following
dimensions were therefore used: 0.065 × 0.034 × 0.027 mm] | k = −7→7 |
| Tmin = 0.055, Tmax = 0.210 | l = −18→19 |
| 5287 measured reflections | |
Refinement top
| Refinement on F2 | 0 restraints |
| R[F2 > 2σ(F2)] = 0.033 | 24 constraints |
| wR(F2) = 0.086 | Weighting scheme based on measured s.u.'s w = 1/[σ2(I) + 0.0016I2] |
| S = 0.94 | (Δ/σ)max = 0.006 |
| 1363 reflections | Δρmax = 2.43 e Å−3 |
| 55 parameters | Δρmin = −2.71 e Å−3 |
Crystal data top
| Tl2CrO4 | V = 999.06 (12) Å3 |
| Mr = 524.8 | Z = 8 |
| Monoclinic, C2/m | Mo Kα radiation |
| a = 12.7458 (8) Å | µ = 66.39 mm−1 |
| b = 5.8070 (3) Å | T = 292 K |
| c = 14.721 (1) Å | 0.25 × 0.03 × 0.03 mm |
| β = 113.519 (7)° | |
Data collection top
Oxford Gemini
diffractometer | 1363 independent reflections |
Absorption correction: analytical
[CrysAlis PRO (Oxford Diffraction, 2009), analytical numerical
absorption
correction using a multifaceted crystal model (Clark & Reid, 1995); it
seemed that one part of the sample did not diffract well and the following
dimensions were therefore used: 0.065 × 0.034 × 0.027 mm] | 710 reflections with I > 3σ(I) |
| Tmin = 0.055, Tmax = 0.210 | Rint = 0.063 |
| 5287 measured reflections | |
Refinement top
| R[F2 > 2σ(F2)] = 0.033 | 55 parameters |
| wR(F2) = 0.086 | 0 restraints |
| S = 0.94 | Δρmax = 2.43 e Å−3 |
| 1363 reflections | Δρmin = −2.71 e Å−3 |
Fractional atomic coordinates and isotropic or equivalent isotropic displacement parameters (Å2) top| | x | y | z | Uiso*/Ueq | |
| Tl1 | 0.88189 (7) | 0.5 | 0.37055 (7) | 0.0347 (3) | |
| Tl2 | 0.57729 (7) | 0.5 | 0.38579 (7) | 0.0338 (3) | |
| Tl3 | 0.18384 (7) | 0 | 0.11434 (7) | 0.0351 (3) | |
| Tl4 | 0.50548 (7) | 0 | 0.13009 (7) | 0.0333 (4) | |
| Cr1a | 0.7235 (2) | 0 | 0.3606 (2) | 0.0232 (9) | |
| O1a | 0.6716 (10) | 0 | 0.4484 (9) | 0.033 (4) | |
| O2a | 0.8650 (8) | 0 | 0.4137 (10) | 0.042 (5) | |
| O3a | 0.6777 (6) | 0.2356 (10) | 0.2909 (6) | 0.026 (3) | |
| Cr1b | 0.3596 (2) | 0.5 | 0.1410 (2) | 0.0232 (9) | |
| O1b | 0.4407 (11) | 0.5 | 0.0757 (8) | 0.033 (4) | |
| O2b | 0.2231 (9) | 0.5 | 0.0639 (9) | 0.042 (4) | |
| O3b | 0.3886 (7) | 0.7356 (10) | 0.2118 (5) | 0.026 (3) | |
Atomic displacement parameters (Å2) top| | U11 | U22 | U33 | U12 | U13 | U23 |
| Tl1 | 0.0332 (5) | 0.0332 (5) | 0.0358 (6) | 0 | 0.0120 (4) | 0 |
| Tl2 | 0.0341 (5) | 0.0360 (5) | 0.0341 (6) | 0 | 0.0165 (4) | 0 |
| Tl3 | 0.0288 (4) | 0.0365 (5) | 0.0357 (6) | 0 | 0.0084 (4) | 0 |
| Tl4 | 0.0371 (5) | 0.0304 (5) | 0.0360 (6) | 0 | 0.0185 (4) | 0 |
| Cr1a | 0.0240 (11) | 0.0193 (11) | 0.0268 (15) | 0 | 0.0108 (10) | 0 |
| O1a | 0.030 (5) | 0.042 (6) | 0.036 (7) | 0 | 0.024 (5) | 0 |
| O2a | 0.019 (5) | 0.033 (6) | 0.062 (9) | 0 | 0.004 (5) | 0 |
| O3a | 0.033 (3) | 0.031 (4) | 0.018 (4) | 0.006 (3) | 0.016 (3) | 0.005 (3) |
| Cr1b | 0.0235 (13) | 0.0193 (11) | 0.0267 (13) | 0 | 0.0100 (10) | 0 |
| O1b | 0.024 (6) | 0.042 (6) | 0.040 (6) | 0 | 0.022 (5) | 0 |
| O2b | 0.024 (6) | 0.033 (6) | 0.050 (7) | 0 | −0.006 (5) | 0 |
| O3b | 0.031 (4) | 0.031 (4) | 0.023 (3) | −0.005 (3) | 0.019 (3) | −0.006 (3) |
Geometric parameters (Å, º) top
| Tl1—O1ai | 3.402 (12) | Tl3—O2bxi | 3.087 (5) |
| Tl1—O1aii | 3.003 (15) | Tl3—O2b | 3.087 (5) |
| Tl1—O2a | 2.998 (4) | Tl3—O2bx | 3.283 (15) |
| Tl1—O2aiii | 2.998 (4) | Tl3—O3bxi | 2.870 (7) |
| Tl1—O3a | 2.841 (7) | Tl3—O3biv | 2.870 (7) |
| Tl1—O3aiv | 2.841 (7) | Tl4—O3a | 2.854 (6) |
| Tl1—O3bv | 2.826 (8) | Tl4—O3axii | 2.854 (6) |
| Tl1—O3bvi | 2.826 (8) | Tl4—O1bxi | 3.037 (3) |
| Tl2—O1a | 3.137 (4) | Tl4—O1b | 3.037 (3) |
| Tl2—O1aiii | 3.137 (4) | Tl4—O2bv | 3.286 (14) |
| Tl2—O1aii | 3.157 (10) | Tl4—O2bx | 3.163 (10) |
| Tl2—O2avii | 2.894 (13) | Tl4—O3bxi | 2.730 (9) |
| Tl2—O2aii | 2.742 (15) | Tl4—O3biv | 2.730 (9) |
| Tl2—O3a | 2.715 (9) | Cr1a—O1a | 1.670 (16) |
| Tl2—O3aiv | 2.715 (9) | Cr1a—O2a | 1.655 (9) |
| Tl2—O3b | 3.049 (7) | Cr1a—O3a | 1.670 (7) |
| Tl2—O3biv | 3.049 (7) | Cr1a—O3axii | 1.670 (7) |
| Tl3—O3aviii | 3.047 (9) | Cr1b—O1b | 1.670 (16) |
| Tl3—O3aix | 3.047 (9) | Cr1b—O2b | 1.655 (10) |
| Tl3—O1bviii | 2.918 (14) | Cr1b—O3b | 1.670 (7) |
| Tl3—O1bx | 2.608 (11) | Cr1b—O3biv | 1.670 (7) |
| | | |
| O1a—Cr1a—O2a | 109.2 (7) | O1b—Cr1b—O2b | 109.2 (7) |
| O1a—Cr1a—O3a | 109.0 (4) | O1b—Cr1b—O3b | 109.0 (4) |
| O1a—Cr1a—O3axii | 109.0 (4) | O1b—Cr1b—O3biv | 109.0 (4) |
| O2a—Cr1a—O3a | 109.8 (4) | O2b—Cr1b—O3b | 109.8 (4) |
| O2a—Cr1a—O3axii | 109.8 (4) | O2b—Cr1b—O3biv | 109.8 (4) |
| O3a—Cr1a—O3axii | 110.1 (4) | O3b—Cr1b—O3biv | 110.1 (4) |
| Symmetry codes: (i) x+1/2, y+1/2, z; (ii) −x+3/2, y+1/2, −z+1; (iii) x, y+1, z; (iv) x, −y+1, z; (v) x+1/2, y−1/2, z; (vi) x+1/2, −y+3/2, z; (vii) x−1/2, y+1/2, z; (viii) x−1/2, y−1/2, z; (ix) x−1/2, −y+1/2, z; (x) −x+1/2, y−1/2, −z; (xi) x, y−1, z; (xii) x, −y, z. |
Experimental details
| Crystal data |
| Chemical formula | Tl2CrO4 |
| Mr | 524.8 |
| Crystal system, space group | Monoclinic, C2/m |
| Temperature (K) | 292 |
| a, b, c (Å) | 12.7458 (8), 5.8070 (3), 14.721 (1) |
| β (°) | 113.519 (7) |
| V (Å3) | 999.06 (12) |
| Z | 8 |
| Radiation type | Mo Kα |
| µ (mm−1) | 66.39 |
| Crystal size (mm) | 0.25 × 0.03 × 0.03 |
| |
| Data collection |
| Diffractometer | Oxford Gemini
diffractometer |
| Absorption correction | Analytical
[CrysAlis PRO (Oxford Diffraction, 2009), analytical numerical
absorption
correction using a multifaceted crystal model (Clark & Reid, 1995); it
seemed that one part of the sample did not diffract well and the following
dimensions were therefore used: 0.065 × 0.034 × 0.027 mm] |
| Tmin, Tmax | 0.055, 0.210 |
No. of measured, independent and
observed [I > 3σ(I)] reflections | 5287, 1363, 710 |
| Rint | 0.063 |
| (sin θ/λ)max (Å−1) | 0.683 |
| |
| Refinement |
| R[F2 > 2σ(F2)], wR(F2), S | 0.033, 0.086, 0.94 |
| No. of reflections | 1363 |
| No. of parameters | 55 |
| Δρmax, Δρmin (e Å−3) | 2.43, −2.71 |
Bond-valence sums (Brese & O'Keeffe, 1991) and chemical strain GII
(Brown, 2005) for the ions in the title structure and for some related
structures. The BVS were calculated for coordination up to 4Å. (A1,
A2, B are the 11- and the 9-coordinated cation and the anion,
respectively.) top | Tl2CrO4a | Tl2CrO4b | Tl2SeO4c | Tl2SeO4d |
| Tl1/A1 | 1.026 (8) | 0.90 (6) | 0.813 (13) | 0.992 (17) |
| Tl2/A2 | 1.221 (13) | 1.31 (8) | 0.971 (14) | 1.151 (18) |
| Tl3 | 1.150 (12) | | | |
| Tl4 | 1.070 (9) | | | |
| Cr1a/B1 | 5.67 (8) | 5.5 (5) | 6.34 (13) | 5.77 (13) |
| O1a/O1 | 1.76 (6) | 1.9 (3) | 2.02 (7) | 1.93 (6) |
| O2a/O2 | 2.03 (4) | 1.9 (3) | 2.03 (8) | 2.03 (6) |
| O3a/O3 | 2.05 (3) | 1.9 (2) | 2.04 (6) | 1.95 (7) |
| O4 | | | | 2.00 (7) |
| Cr1b | 5.65 (8) | | | |
| O1b | 2.03 (6) | | | |
| O2b | 1.79 (4) | | | |
| O3b | 2.04 (3) | | | |
| GII | 0.187 (19) | 0.238 (155) | 0.149 (52) | 0.110 (40) |
| | | | |
| Tl2SO4e | K2SeO4f | K2CrO4g | K2SO4h |
| A1 | 0.838 (6) | 0.943 (7) | 0.9358 (16) | 1.0795 (18) |
| A2 | 0.990 (8) | 1.273 (7) | 1.301 (2) | 1.324 (3) |
| B | 6.09 (7) | 6.24 (4) | 5.966 (12) | 5.997 (16) |
| O1 | 1.86 (4) | 2.123 (15) | 2.006 (7) | 2.015 (10) |
| O2 | 2.07 (4) | 2.12 (2) | 2.076 (6) | 2.152 (9) |
| O3 | 2.00 (3) | 2.09 (3) | 2.061 (6) | 2.117 (7) |
| GII | 0.092 (4) | 0.161 (10) | 0.125 (1) | 0.152 (2) |
| References: (a) this work; (b) Carter & Margulis (1972);
(c) 293 K; Friese et al. (2004);
(d) 30 K; Friese et al. (2004);
(e) Wallez et al. (2004);
(f) González-Silgo et al. (1996);
(g) Toriumi & Saito, (1978);
(h) Ojima et al. (1995). |
Characteristics of Tl+–Tl+ pairs in the title structure.
Tl+···Tl+ is the distance between the two cations of a pair; the
symmetry code is given for the second cation. The Tl+—O2- column gives
the minimum and maximum Tl+—O2- distances for the O atoms shared by the
two cations. N is the number of shared O atoms in the coordination environments
around the pairs of Tl+ cations. top| Pair | Tl+···Tl+ (Å) | Tl+—O2- (Å) | N |
| Tl1/Tl1(-x + 2, y, -z + 1) | 3.7991 (14) | 3.003 (15)-3.402 (12) | 2 |
| Tl1/Tl2(x, y, z) | 3.9772 (15) | 2.715 (9)-2.841 (7) | 2 |
| Tl1/Tl2(x + 1/2, y - 1/2, z) | 3.7733 (9) | 2.826 (8)-3.402 (12) | 3 |
| Tl1/Tl2(x + 1/2, y + 1/2, z) | 3.7733 (9) | 2.826 (8)-3.402 (12) | 3 |
| Tl1/Tl3(x + 1/2, y + 1/2, z) | 3.6053 (14) | 2.826 (8)-3.047 (9) | 4 |
| Tl1/Tl4(x + 1/2, y + 1/2, z) | 4.4116 (17) | 2.730 (9)-2.730 (9) | 2 |
| Tl3/Tl4(x, y, z) | 4.0127 (14) | 2.730 (9)-3.283 (15) | 3 |
| Tl3/Tl4(x - 1/2, y - 1/2, z) | 3.7513 (10) | 2.854 (7)-3.286 (14) | 3 |
| Tl3/Tl4(x - 1/2, y + 1/2, z) | 3.7513 (10) | 2.854 (7)-3.286 (14) | 3 |
| Tl4/Tl4(-x + 1, y, -z) | 3.7764 (17) | 3.163 (10)-3.286 (14) | 2 |
Characteristics of Tl+–Tl+ pairs in the β-K2SO4 polymorph of
Tl2CrO4 (Carter & Margulis, 1972). Definitions are the same as in
Table 2. top| Pair | Tl+···Tl+ (Å) | Tl+—O2- (Å) | N |
| Tl1/Tl1(x - 1/2, -y, -z + 1) | 4.406 (7) | 2.975 (10)-3.52 (8) | 3 |
| Tl1/Tl1(x + 1/2, -y, -z + 1) | 4.406 (7) | 2.975 (10)-3.52 (8) | 3 |
| Tl1/Tl2(-x + 1/2, -y + 1/2, z + 1/2) | 4.313 (8) | 2.80 (5) -3.52 (8) | 3 |
| Tl1/Tl2(x, y - 1, z) | 3.992 (8) | 2.70 (9) -3.08 (6) | 3 |
| Tl1/Tl2(x - 1/2, -y + 1, -z) | 4.189 (7) | 2.70 (9) -3.31 (5) | 3 |
| Tl1/Tl2(x + 1/2, -y + 1, -z) | 4.189 (7) | 2.70 (9) -3.31 (5) | 3 |
| Tl1/Tl2(-x, y - 1/2, -z + 1/2) | 3.938 (6) | 2.80 (5) -3.80 (7) | 4 |
| Tl1/Tl2(-x + 1, y - 1/2, -z + 1/2) | 3.938 (6) | 2.80 (5) -3.80 (7) | 4 |
| Tl2/Tl2(-x + 1/2, -y + 3/2, z - 1/2) | 4.071 (9) | 2.71 (8) -2.85 (8) | 3 |
| Tl2/Tl2(-x + 1/2, -y + 3/2, z + 1/2) | 4.071 (9) | 2.71 (8) -2.85 (8) | 3 |
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inorganic compounds
![[Figure 1]](http://journals.iucr.org/c/issues/2010/05/00/fn3055/fn3055fig1thm.gif)
![[Figure 2]](http://journals.iucr.org/c/issues/2010/05/00/fn3055/fn3055fig2thm.gif)
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![[Figure 4]](http://journals.iucr.org/c/issues/2010/05/00/fn3055/fn3055fig4thm.gif)
The aim of the present work was the growth of single crystals of Tl2CrO4 of the known modification belonging to the β-K2SO4 family. Spectroscopic experiments were planned for these samples. Moreover, the previous structure determination of Tl2CrO4 (Carter & Margulis, 1972) does not meet current standards: Robs = 0.07, and some structural features deviate slightly from the trends in the β-K2SO4 family (see below and Table 1). Therefore, we also aimed to carry out a new single-crystal X-ray structure determination of the compound. As a result of our experiment a new modification of Tl2CrO4 has been prepared, the structure of which is presented here and discussed.
Tl2SeO4 (Fábry & Breczewski, 1993; Friese et al., 2004), Tl2CrO4 (Carter & Margulis, 1972), K2SeO4 (see, for example, González-Silgo et al., 1996) and K2CrO4 (Toriumi & Saito, 1978) are isostructural compounds belonging to the β-K2SO4 family, a structural family characterised by its variety of low-temperature phase transitions. Thus, K2SeO4 and Tl2SeO4 are known to undergo low-temperature phase transitions, while K2CrO4 and Tl2CrO4 do not (Fábry & Pérez-Mato, 1994).
Tl2SeO4, a compound chemically and structurally closely related to the title structure, is exceptional among the members of the β-K2SO4 family because it undergoes a unique sequence of phase transitions during cooling. A second-order phase transition takes place at 97 K (Matsuo & Ikehata, 2004), followed by a first-order low-temperature phase transition at about 72 K (Grunwald et al., 1984a,b). The latter phase transition is accompanied by a change in symmetry from Pnma to P212121 without multiplication of the number of formula units in the unit cell (see, for example, Friese et al., 2004). A reverse phase transition during heating takes place at 76 K (Matsuo et al., 2000; Matsuo & Ikehata, 2004). In other members of this structural family a sequence of phase transitions often takes place from the incommensurately modulated to commensurately modulated phases on lowering the temperature.
The difference between Tl2SeO4 and the other members of the β-K2SO4 family may be related to the extreme underbonding (Table 1) of one of the two independent cations that are present in this structural type. This underbonding is quite common in the members of the β-K2SO4 family. In the case of Tl2SeO4, however, and to a lesser extent in Tl2CrO4 (Carter & Margulis, 1972), underbonding is quite prominent (Fábry & Pérez-Mato, 1994). It is interesting that this underbonded cation is often bonded by quite a short cation–anion bond, often the shortest one in the structure (Fábry & Pérez-Mato, 1994). This holds for, among others, the structures of Tl2SeO4 (Fábry & Breczewski, 1993; Friese et al., 2004), Tl2CrO4 (Carter & Margulis, 1972) and K2SeO4 (González-Silgo et al., 1996).
Although the respective cations in Tl2CrO4 and K2CrO4 are underbonded, low-temperature phase transitions are not known, in contrast with Tl2SeO4 and K2SeO4 (González-Silgo et al., 1996). However, spectroscopic measurements indicated a pretransitional phenomenon in K2CrO4, i.e. an incomplete mode softening (Etxebarría et al., 1992). It cannot be excluded that a similar pretransitional phenomenon may occur in Tl2CrO4.
The unit-cell volume of the title polymorph is almost exactly doubled compared with the known polymorph described by Carter & Margulis (1972). The volumes of the asymmetric units in the title structure and the β-K2SO4 polymorph are 124.88 and 125.37 Å3, respectively. There are four independent Tl+ cations and two [CrO4]2- anions in the title structure, in contrast with the β-K2SO4 polymorph with two independent cations and one anion. Nevertheless, both modifications of Tl2CrO4 show similar structural features. The constituent cations and anions are situated on the crystallographic mirror planes in the two polymorphs. The transformation of the lattice parameters of the β-K2SO4 modification (o index), [am,bm,cm] = [/0 - 1 -1/1 0 0/0 0 2/] [ao,bo,co], leads to a unit cell similar to that of the title structure (m index). ([am,bm,cm] and [ao,bo,co] are the column matrices, while /0 - 1 -1/, /1 0 0/ and /0 0 2/ are the first, second and third rows, respectively, of the 3 × 3 matrix.) The transformed unit-cell parameters are 13.328 (5), 5.910 (4) and 15.820 (8) Å, 90, 126.40 (3) and 90°, and V = 1003 (1) Å3.
Fig. 1 shows the packing of the constituents in the unit cell of the title structure when viewed along the unit-cell b axis. Fig. 2 shows a view of the β-K2SO4 polymorph (Carter & Margulis, 1972), also perpendicular to the mirror plane m, using the original unit-cell setting Pmcn. It can be seen from Fig. 1 that the cation pairs Tl1/Tl2 and Tl3/Tl4 are situated along planes parallel to (001); the former pairs are situated at approximately z = 1/2 and the latter ones at approximately z = 0. The arrangements within the sections in the title structure and the β-K2SO4 polymorph show similarities that are depicted by boxes in the figures.
Cations Tl1, Tl2, Tl3 and Tl4 are surrounded by eight, nine, nine and eight O atoms, respectively (Figs. 3 and 4), within a distance of 4.0 Å. In fact, the longest Tl—O distance among the coordinated O atoms in the title structure is 3.407 (15) Å for Tl1—O1(x + 1/2, y + 1/2, z). The coordination numbers (CN) in the title structure are on average lower than in the β-K2SO4 polymorph, where the CN up to 3.5 Å is 9 for both cations, and 11 and 9, respectively, up to 4.0 Å. Comparing the two polymorphs, the cations are more equally coordinated in the title structure. In both polymorphs, neighbouring cationic polyhedra around the Tl+ cation pairs share a plane in most cases (Tables 2 and 3), although in the title structure the the polyhedra are also shared by the edges.
A comparison of the bond-valence sums (BVS) in the title structure with those of related structures is given in Table 1. The cation BVS are much closer to each other than in the β-K2SO4 polymorph of Tl2CrO4 (Carter & Margulis, 1972), where one of the cations is underbonded while the other is bound significantly more firmly. This is a tendency observed elsewhere in the β-K2SO4 structural family (Fábry & Pérez-Mato, 1994).
In the title structure, the relative contributions of the bond valence pertinent to the shortest Tl+—O2- contact within the coordination environments of each cation, Tl1, Tl2, Tl3 and Tl4, are 0.166 (8), 0.189 (5), 0.268 (8) and 0.196 (5), respectively. In the case of Tl3, the highest bond valence [0.308 (9)] corresponds to the shortest cation–anion bond in the structure, which is 2.608 (11) Å. On the other hand, in the β-K2SO4 polymorph (Carter & Margulis, 1972), the shortest Tl+—O2- contacts were determined as 2.70 (9) Å (eleven-oxygen coordinated Tl) and 2.71 (8) (nine-oxygen coordinated Tl), with relative contributions of the respective bond valences of 0.277 (67) and 0.179 (39). However, by analogy with Tl2SeO4 (Friese et al., 2004; Fábry & Breczewski, 1993), it can be expected that the former distance should be somewhat shorter and the latter longer.
In general, a higher CN means that the pertinent cation tends to be situated in a larger anionic cavity (Brown, 1992), as seen in the β-K2SO4 family, i.e. also in the β-K2SO4 polymorph of Tl2CrO4. Despite this, the title structure, with lower CN, is less densely packed. This could be attributed to a different packing of the anions in each polymorph. However, in the title structure even the closest anions are somewhat closer to each other than in the β-K2SO4 polymorph: the closest distances between Cr atoms are 4.236 (6) and 4.887 (19) Å, respectively.
It is difficult to predict which of either modification of Tl2CrO4 is thermodynamically more stable. The somewhat smaller unit-cell volume of the title structure indicates that it should be rather more stable than its β-K2SO4 polymorph. Also, the distribution of the cation BVS in the title structure, where not all the cations are underbonded, rather supports the view that it may be more stable than the modification isostructural with β-K2SO4. Also, the fact that, in the title structure, the anionic polyhedra are interconnected by the edges, and not by the faces, would enhance the probability that it would relax without abrupt changes (Tables 2 and 3) when cooled down. The low-temperature phase transition in the closely related Tl2SeO4 (Table 1) causes a decrease in the CN of the cations from 11 to 10 and from 9 to 8 (up to 4.0 Å from the central cation), i.e. the situation is similar in this respect to the title structure. It is also of interest that, in the title structure, there are significantly and unusually underbonded O atoms, O1a and O2b (Table 1). The dependence of the lattice parameters on temperature in the interval 90–300 K did not indicate a phase transition. (The scan was performed in 10 K intervals.) The differential scanning calorimetric experiments did not reveal a low-temperature phase transition either. However, the sample could contain the β-K2SO4 polymorph as well, since the temperatures pertinent to the high-temperature phase transition during heating and cooling corresponded well with the experiments carried out by Natarajan & Secco (1974).
The chemical strains GII (global instability indices) of some related compounds (Brown, 2005; Table 1) do not permit any definite conclusion about the structural stability of the title structure compared with the β-K2SO4 polymorph. This is partly due to the fact that, in most cases, there are both overbonded and underbonded cations in the β-K2SO4 structures (such as Tl2SeO4), while it has been shown that precisely the underbonding of one of the constituent cations is related to the structural stability (Fábry & Pérez-Mato, 1994). The low-temperature phase transitions cause an increase in the BVS of both cations, though mostly the underbonded ones. Thus, the GII are not sensitive for this structural group. For example, the GII of the low-temperature phase of K2SeO4 (Yamada et al., 1984) is 0.212 (24), which is larger than that of the room-temperature phase of K2SeO4 [0.161 (10)] (Table 1). The other reason for the lower sensitivity of GII in this case is due to the lower reliability of structure determinations of compounds with heavy cations such as Tl+, which causes severe absorption at commonly used radiation wavelengths.