short communications\(\def\hfill{\hskip 5em}\def\hfil{\hskip 3em}\def\eqno#1{\hfil {#1}}\)

Journal logoSTRUCTURAL SCIENCE
CRYSTAL ENGINEERING
MATERIALS
ISSN: 2052-5206
Volume 69| Part 6| December 2013| Pages 629-633

Clarification of possible ordered distributions of trivalent cations in layered double hydroxides and an explanation for the observed variation in the lower solid-solution limit

CROSSMARK_Color_square_no_text.svg

aSchool of Civil Engineering, University of Leeds, Woodhouse Lane, Leeds LS2 9JT, England
*Correspondence e-mail: i.g.richardson@leeds.ac.uk

(Received 30 July 2013; accepted 11 October 2013; online 18 November 2013)

The sequence of hexagonal ordered distributions of trivalent cations that are possible in the octahedral layer of layered double hydroxides is clarified, including the link between the composition and the supercell a parameter. A plausible explanation is provided for the observed variation in the lower solid-solution limit.

1. Introduction

Layered double hydroxide (LDH) phases are derived from layered single hydroxides [i.e. β-M(OH)2 phases] by the substitution of a fraction (x) of the divalent cations in the octahedral layer by trivalent cations. There are many natural LDH phases (Mills et al., 2012[Mills, S. J., Christy, A. G., Génin, J.-M. R., Kameda, T. & Colombo, F. (2012). Mineral. Mag. 76, 1289-1336.]) and synthetic preparations are studied widely because of their use in a wide range of applications (Cavani et al., 1991[Cavani, F., Trifirò, F. & Vaccari, A. (1991). Catal. Today, 11, 173-301.]). Evidence for and against long-range ordering of the trivalent cations has been discussed extensively (e.g. see Evans & Slade, 2006[Evans, D. G. & Slade, R. C. T. (2006). Struct. Bond. 119, 1-87.]). The view of Drits & Bookin (2001[Drits, V. A. & Bookin, A. S. (2001). Layered Double Hydroxides: Present and Future, edited by V. Rives, Ch. 2, pp. 41-100. New York: Nova Science Publishers, Inc.]) is that complete cation ordering probably depends on both the M2+:M3+ ratio and the conditions of crystallization, with those conditions that produce single crystals more preferable for cation order than those that produce finely dispersed material, which was considered likely to be accompanied by some heterogeneity that would result in imperfect long-range cation order. This would mean that supercell reflections would be absent or difficult to observe. The values of x of [1\over 3] and [1\over 4] are the two largest values that are possible for hexagonal ordered distributions of trivalent cations (Brindley & Kikkawa, 1979[Brindley, G. W. & Kikkawa, S. (1979). Am. Mineral. 64, 836-843.]) and as a consequence these are the most commonly studied compositions (Richardson, 2013a[Richardson, I. G. (2013a). Acta Cryst. B69, 414-417.]). Other ordered distributions that correspond to lower values of x have been considered but there is dispute concerning the exact supercell parameters that are possible. For example, Drits & Bookin (2001[Drits, V. A. & Bookin, A. S. (2001). Layered Double Hydroxides: Present and Future, edited by V. Rives, Ch. 2, pp. 41-100. New York: Nova Science Publishers, Inc.]) refer to supercell parameters of (5)1/2 a0 and (8)1/2a0, but – as will be demonstrated in this paper – neither of these is possible (a0 is the a parameter for the cell where there is no differentiation between cations). The purpose of this paper is twofold: firstly to demonstrate unequivocally the ordered distributions that are possible, and secondly to use the results of that demonstration to provide a plausible explanation for the variation in the lower value of x that has been observed by experiment.

2. Possible ordered distributions of trivalent cations in layered double hydroxides

The hexagonal ordered distributions of M3+ ions that correspond to the seven largest values of x are shown in Fig. 1[link]. The open circles in Fig. 1[link] represent M2+ ions and the full circles M3+ ions. For an M2+ ion at position 0, the nearest cation neighbours are at position 1, the next-nearest at position 2, followed by 3, 4, 5 etc. (i.e. the first, second, third, … cation coordination shells). Substitution of M3+ for M2+ results in a +1 charge and so if the first substitution occurred at position 0, it is often considered that the next substitution would occur no closer than position 2 because of mutual electrostatic repulsions (Brindley & Kikkawa, 1979[Brindley, G. W. & Kikkawa, S. (1979). Am. Mineral. 64, 836-843.]; Hofmeister & von Platen, 1992[Hofmeister, W. & van Platen, H. (1992). Cryst. Rev. 3, 3-26.]; Drits & Bookin, 2001[Drits, V. A. & Bookin, A. S. (2001). Layered Double Hydroxides: Present and Future, edited by V. Rives, Ch. 2, pp. 41-100. New York: Nova Science Publishers, Inc.]). Continuation of this pattern of substitution gives the arrangement shown in Fig. 1[link] (2), where each M3+ ion is surrounded by 6 M2+ ions and the M2+:M3+ ratio is 2 (and so x = [1\over 3]); this composition corresponds to the maximum substitution that is observed in the majority of studies of Mg–Al LDH phases, which can be seen by comparing the position of the data points with the thin lines that are labelled with 2 in Fig. 2[link], which includes the data from numerous studies that were collated by Richardson (2013b[Richardson, I. G. (2013b). Acta Cryst. B69, 150-162.]) for Mg–Al LDH phases that have a variety of interlayer anions. The full line on Fig. 1[link] (2) indicates the supercell. In this case the a parameter of the supercell is equal to (3)1/2 a0, where a0 is the value for the subcell, where there is no differentiation between cations, i.e. as shown in Fig. 1[link] (1). The actual value of a0 of course varies with x, as shown in the ax plots in Richardson (2013a[Richardson, I. G. (2013a). Acta Cryst. B69, 414-417.],b[Richardson, I. G. (2013b). Acta Cryst. B69, 150-162.]) that include data that were collated from numerous sources (Fig. 1 of Richardson, 2013a[Richardson, I. G. (2013a). Acta Cryst. B69, 414-417.], for Zn–Al phases; Fig. 2 of Richardson, 2013a[Richardson, I. G. (2013a). Acta Cryst. B69, 414-417.], for Co–Al phases; Fig. 4a of Richardson, 2013b[Richardson, I. G. (2013b). Acta Cryst. B69, 150-162.], for Ni–Al and Ni–Fe phases; Fig. 6a of Richardson, 2013b[Richardson, I. G. (2013b). Acta Cryst. B69, 150-162.], for Mg–Al and Mg–Ga phases). The next closest ordered distributions are obtained by placing the M3+ ions at position 3, which gives the arrangement in Fig. 1[link] (3), followed by position 4, which gives Fig. 1[link] (4), and so on. The compositions and values of the supercell a parameter are given in Table 1[link]. Drits & Bookin (2001[Drits, V. A. & Bookin, A. S. (2001). Layered Double Hydroxides: Present and Future, edited by V. Rives, Ch. 2, pp. 41-100. New York: Nova Science Publishers, Inc.]) note that for M2+:M3+ = Q, a = (Q+1)1/2 a0. Inspection of Table 1[link] shows that this is correct, but also that the values of Q are restricted: a/a0 follows the sequence (i2 + ij + j2)1/2, where i, j = 0, 1, 2, 3, … etc. (except for i = j = 0) and so the possible values of Q (i.e. M2+:M3+ ratios) for ordered distributions of trivalent cations are restricted to the sequence i2 + ij + j2 - 1; ordered distributions have values of x equal to 1/ (i2 + ij + j2) and a/a0 = (1/x)1/2. As noted above, Drits & Bookin (2001[Drits, V. A. & Bookin, A. S. (2001). Layered Double Hydroxides: Present and Future, edited by V. Rives, Ch. 2, pp. 41-100. New York: Nova Science Publishers, Inc.]) refer to supercell parameters of (5)1/2 a0 and (8)1/2 a0; it is evident from Fig. 1[link] and Table 1[link] that neither of these is possible. The superstructures that are known to exist in the hydrotalcite supergroup are illustrated in a less detailed figure in Mills et al. (2012[Mills, S. J., Christy, A. G., Génin, J.-M. R., Kameda, T. & Colombo, F. (2012). Mineral. Mag. 76, 1289-1336.]) who note that the unusually large 271/2 ×271/2 superstructure reported for karchevskyite (by Britvin et al., 2008[Britvin, S. N., Chukanov, N. V., Bekenova, G. K., Tagovkina, M. A., Antonov, A. V., Bogdanova, A. N. & Krasnova, N. I. (2008). Geol. Ore Deposits, 50, 556-564.]) is presumably due to ordering of the interlayer species [because the value of x = 0.333 for karchevskyite corresponds to a supercell a parameter of (3)1/2 a0; (27)1/2 a0 is obtained with i = j = 3 and so x = 0.037].

Table 1
The composition and the supercell a parameter for the ordered distributions of trivalent cations that are shown in Fig. 1[link]

a0 is the value for the cell where there is no differentiation between cations. It is evident that a/ a0 = (Q + 1)1/2 and that it follows the sequence (i2 + ij + j2)1/2, where i, j = 0, 1, 2, 3, … etc. (except for i = j = 0); ordered distributions of trivalent cations therefore have values of x equal to 1/ (i2 + ij + j2) and a/a0 = (1 / x)1/2.

Position No. M2+/M3+ (= Q) x a parameter of supercell a/a0 i, j i2 + ij + j2
1 0 0 a0 11/2 0, 1 1
2 2 0.333 (3)1/2 a0 31/2 1, 1 3
3 3 0.250 2a0 41/2 0, 2 4
4 6 0.143 ( 7)1/2 a0 71/2 1, 2 7
5 8 0.111 3a0 91/2 0, 3 9
6 11 0.083 (12)1/2 a0 = 2(3)1/2 a0 121/2 2, 2 12
7 12 0.077 (13)1/2 a0 131/2 1, 3 13
8 15 0.063 4a0 161/2 0, 4 16
[Figure 1]
Figure 1
Hexagonal ordered distributions of M3+ ions in the octahedral layer of layered double hydroxides. The open circles represent M2+ ions and the full circles M3+. The full line indicates the supercell. The numbers are explained in the text.
[Figure 2]
Figure 2
Plot of the a parameter against x for a range of Mg–Al (circles) and Mg–Ga (triangles) layered double hydroxides (LDH) reported in the literature; the data for the Mg–Al LDH involve a variety of interlayer anions (i.e. OH, CO32−, NO3, Cl) and are from: Mg–Al: Bellotto et al., 1996[Bellotto, M., Rebours, B., Clause, O., Lynch, J., Bazin, D. & Elkaïm, E. (1996). J. Phys. Chem. 100, 8527-8534.]; Bîrjega et al., 2005[Bîrjega, R., Pavel, O. D., Costentin, G., Che, M. & Angelescu, E. (2005). Appl. Catal. Gen. 288, 185-193.]; Brindley & Kikkawa, 1979[Brindley, G. W. & Kikkawa, S. (1979). Am. Mineral. 64, 836-843.]; Budhysutanto et al., 2011[Budhysutanto, W. N., van Agterveld, D., Schomaker, E., Rossenaar, B. D., van Rosmalen, G. M. & Kramer, H. J. M. (2011). Appl. Clay Sci. 52, 374-380.]; Gastuche et al., 1967[Gastuche, M. C., Brown, G. & Mortland, M. M. (1967). Clay Miner. 7, 177-192.]; Han et al., 1998[Han, S., Hou, W., Zhang, C., Sun, D., Huang, X. & Wang, G. (1998). J. Chem. Soc. Faraday Trans. 94, 915-918.]; Jinesh et al., 2010[Jinesh, C., Antonyraj, C. A. & Kannan, S. (2010). Appl. Clay Sci. 48, 243-249.]; Kaneyoshi & Jones, 1999[Kaneyoshi, M. & Jones, W. (1999). J. Mater. Chem. 9, 805-811.]; Kukkadapu et al., 1997[Kukkadapu, R. K., Witkowski, M. S. & Amonette, J. E. (1997). Chem. Mater. 9, 417-419.]; Mascolo & Marino, 1980[Mascolo, G. & Marino, O. (1980). Miner. Mag. 43, 619-621.]; Miyata, 1980[Miyata, S. (1980). Clays Clay Miner. 28, 50-56.]; Pausch et al., 1986[Pausch, I., Lohse, H.-H., Schurmann, K. & Allmann, R. (1986). Clays Clay Mineral. 34, 507-510.]; Rao et al., 1998[Rao, K. K., Gravelle, M., Valente, J. S. & Figueras, F. (1998). J. Catal. 173, 115-121.]; Sato et al., 1988[Sato, T., Fujita, H., Endo, T. & Shimada, M. (1988). React. Solids, 5, 219-228.]; Shen et al., 1994[Shen, J., Kobe, J. M., Chen, Y. & Dumesic, J. A. (1994). Langmuir, 10, 3902-3908.]; Valente et al., 2011[Valente, J. S., Pfeiffer, H., Lima, E., Prince, J. & Flores, J. (2011). J. Catal. 279, 196-204.]; Xu & Zeng, 2001[Xu, Z. P. & Zeng, H. C. (2001). J. Phys. Chem. B, 105, 1743-1749.]; Yun & Pinnavaia, 1995[Yun, S. K. & Pinnavaia, T. J. (1995). Chem. Mater. 7, 348-354.]; Mg–Ga: Bellotto et al., 1996[Bellotto, M., Rebours, B., Clause, O., Lynch, J., Bazin, D. & Elkaïm, E. (1996). J. Phys. Chem. 100, 8527-8534.]; López-Salinas et al., 1997[López-Salinas, E., García-Sánchez, M., Montoya, J. A., Acosta, D. R., Abasolo, J. A. & Schifter, I. (1997). Langmuir, 13, 4748-4753.]. The full lines are the result of the linear regression analyses of both sets of data and the filled diamond represents the β polymorph of magnesium hydroxide (i.e. brucite). The dashed lines represent the values of a calculated from theory [using equation (15) in Richardson, 2013b[Richardson, I. G. (2013b). Acta Cryst. B69, 150-162.]]. The open diamond can be taken to represent a theoretical α form of magnesium hydroxide (Richardson, 2013b[Richardson, I. G. (2013b). Acta Cryst. B69, 150-162.]). The bold numbers correspond to the ordered distributions of M3+ ions in the octahedral layer that are illustrated in Fig. 1[link]; the three compositions that are labelled `x' are explained in the text.

Orthorhombic ordered distributions of M3+ ions can be created, as illustrated in Fig. 3[link] (the open circles again represent M2+ ions and the full circles M3+). However, it is not obvious why such distributions would occur in preference to the hexagonal distributions that are illustrated in Fig. 1[link] because in those cases the trivalent cations are distributed evenly. Nevertheless, Aimoz et al. (2012[Aimoz, L., Taviot-Guého, C., Churakov, S. V., Chukalina, M., Dähn, R., Curti, E., Bordet, P. & Vespa, M. (2012). J. Phys. Chem. C, 116, 5460-5475.]) claimed recently that the distribution in Fig. 3[link](a) occurred in a Zn–Al LDH sample that had M2+:M3+ = 3 because their results were interpreted to indicate that trivalent ions were present in both the second and third metal coordination shells (from Zn), i.e. Al3+ ions at positions 2 and 3. However, their data do not appear to be conclusive: inspection of their Fig. 9(d) shows that whilst there is what they describe as a `local maximum' at s = 1 (the reader is referred to their paper for the meaning of `s'), the maximum of the peak envelope is at s > 1, which would mean that Al was absent from the third shell, which would support the hexagonal supercell rather than ortho­rhombic.

[Figure 3]
Figure 3
The orthorhombic ordered distributions of M3+ ions in the octahedral layer of layered double hydroxides that correspond to the four largest possible values of x: (a) 0.25; (b) 0.167; (c) 0.125; (d) 0.083. The open circles represent M2+ ions and the full circles M3+.

3. The maximum value of x and an explanation for the variation in the lower value

The data collated for Mg–Al LDH systems in Fig. 2[link] indicate an interesting phenomenon at low x: the minimum value is variable, but it appears to occur at particular fixed values. This observation requires a satisfactory explanation, which can perhaps be obtained by considering the possible ordered distributions of the trivalent ions in the octahedral layer, as detailed above. The range of values of x over which Vegard's Law holds (Vegard, 1921[Vegard, L. (1921). Z. Phys. 5, 17-26.]; West, 1984[West, A. R. (1984). Solid-State Chemistry and its Applications. Chichester: Wiley.]; Denton & Ashcroft, 1991[Denton, A. R. & Ashcroft, N. W. (1991). Phys. Rev. A, 43, 3161-3164.]), i.e. the extent of solid solution in LDH phases, has been the subject of much discussion. In a seminal paper, Brindley & Kikkawa (1979[Brindley, G. W. & Kikkawa, S. (1979). Am. Mineral. 64, 836-843.]) considered that the highest substitution of M2+ ions by M3+ was near to one in three (i.e. x = 0.333), and that the lowest was one in five or six (x = 0.200 or 0.167). Their view has been repeated often, particularly in works concerning synthetic Mg–Al preparations, but extensions to the range have been demonstrated regularly, and this is reflected in the data collated from many studies by Richardson for a variety of systems (Richardson, 2013b[Richardson, I. G. (2013b). Acta Cryst. B69, 150-162.]: Mg–Al and Mg–Ga systems, which are reproduced in Fig. 2[link]; Ni–Al and Ni–Fe; Richardson, 2013a[Richardson, I. G. (2013a). Acta Cryst. B69, 414-417.]: Zn–Al and Co–Al systems). Inspection of Fig. 4 of Richardson (2013b[Richardson, I. G. (2013b). Acta Cryst. B69, 150-162.]) indicates that the upper value of x for Ni-based systems appears to be greater than 0.333, perhaps as high as 0.4, and the lower value is less than 0.1. The maximum in the Mg-based systems varies with the method of synthesis, but it is most commonly 0.333, which is clearly evident in Fig. 2[link] and in Fig. 6 of Richardson (2013b[Richardson, I. G. (2013b). Acta Cryst. B69, 150-162.]). The a and c′ parameters for x greater than 0.333 are generally essentially constant because those samples consist of a mixture of the LDH phase that has x = 0.333 and an Al-rich second phase, which can be crystalline (e.g. bayerite) or amorphous. The data points that are included in Fig. 2[link] which have values of a that continue the linear trend beyond x = 0.333 are from Kukkadapu et al. (1997[Kukkadapu, R. K., Witkowski, M. S. & Amonette, J. E. (1997). Chem. Mater. 9, 417-419.]) whose samples involved the terephthalate dianion, C6H4(COO)2, as the charge-compensating interlayer ion.

If the trivalent ions are ordered – albeit with some imperfections that result in the absence of supercell reflections – then the minimum value of x that has been observed (to the author's knowledge) corresponds to distribution 6 in Fig. 1[link] for the Ni-based systems, 8 for Mg–Ga (see Fig. 2[link]), and 4 for Zn–Al. As noted earlier, the minimum value of x in the Mg–Al systems is variable and seems to occur at particular fixed values. The steep slope of the linear part of the ax plot (Fig. 2[link]) means that the values of x that correspond to where the a parameter deviates from linearity are rather exact; they are indicated in the figure by three thin lines labelled `x'. The line with the lowest value of x at approximately 0.15 most likely corresponds to distribution 4, perhaps with occasional layers of 2 and 3 (a value of x = 0.151 would result from ratios for distributions 2:4 and 3:4 of 1:24 and 1:12, respectively). Whilst it is evident that the other two lines that are labelled `x' do not correspond to any of the ordered distributions in Fig. 1[link] (the compositions are given in Table 1[link]), they can in fact be explained by very simple combinations: the middle line is drawn at x = 0.1806, which corresponds to a 1:1 mix of distributions 3 and 5; the right hand line is drawn at x = 0.2083, which corresponds to a 1:1 mix of 2 and 6. Inspection of Fig. 1[link] shows that distributions 3 and 5 are related in a straightforward way, as are distributions 2 and 6. Simple stacking sequences of related ordered distributions of trivalent ions seem therefore to provide a plausible explanation for the compositional trends observed at low x in the Mg–Al system.

Whilst compositions with [x \gt {1 \over 3}] are unusual, they have nevertheless been observed (see Fig. 2[link]); it is clear from Fig. 1[link] that the octahedral layer in such preparations must include trivalent cations that are present in edge-sharing octahedra. Computer simulations have indicated that these could occur as a regular chain structure, with percolation at [x = {1\over 2}] resulting in infinite straight chains of metal–oxygen octahedra containing divalent cations alternating with others containing trivalent cations (Xiao et al., 1999[Xiao, Y., Thorpe, M. F. & Parkinson, J. B. (1999). Phys. Rev. B, 59, 277-285.]). Ruby et al. (2010[Ruby, C., Abdelmoula, M., Naille, S., Renard, A., Khare, V., Ona-Nguema, G., Morin, G. & Génin, J.-M. R. (2010). Geochim. Cosmochim. Acta, 74, 953-966.]) claim to have produced Fe2+–Fe3+ LDH phases (i.e. the so-called `green rust') that have values of x of 0, [{1 \over 3}], [{2 \over 3}] and 1. By analogy with other LDH systems, it seems reasonable to suppose that the phase that has x = 0 is an α form of divalent metal hydroxide (Richardson, 2013a[Richardson, I. G. (2013a). Acta Cryst. B69, 414-417.],b[Richardson, I. G. (2013b). Acta Cryst. B69, 150-162.]). The phases that have x > 0 are discussed in detail by Mills et al. (2012[Mills, S. J., Christy, A. G., Génin, J.-M. R., Kameda, T. & Colombo, F. (2012). Mineral. Mag. 76, 1289-1336.]), who:

  • (i) redefine the mineral fougèrite as a Fe2+–Fe3+ hydroxycarbonate LDH phase that has [x = {1\over 3}];

  • (ii) define a Fe2+–Fe3+ oxyhydroxy­carbonate LDH phase that has [x = {2\over 3}] as trébeurdenite (oxyhydroxycarbonate because some deprotonation of the main layer hydroxyl groups is proposed);

  • (iii) name a ferric oxyhydroxy­carbonate LDH phase (i.e. x = 1) as mössbauerite.

Ruby et al. (2010[Ruby, C., Abdelmoula, M., Naille, S., Renard, A., Khare, V., Ona-Nguema, G., Morin, G. & Génin, J.-M. R. (2010). Geochim. Cosmochim. Acta, 74, 953-966.]) suggest that a preparation that is made with a composition between any pair of these four phases will consist of a mixture of the two end-members. The quality of the X-ray diffraction (XRD) data presented in Ruby et al. (2010[Ruby, C., Abdelmoula, M., Naille, S., Renard, A., Khare, V., Ona-Nguema, G., Morin, G. & Génin, J.-M. R. (2010). Geochim. Cosmochim. Acta, 74, 953-966.]) deteriorates very significantly as the value of x increases: they state that `a degradation of the diffractogram is observed with global peak broadening when x increases and some lines are no longer detectable for x values of 0.83 and 1'. Their XRD data for these two compositions are reproduced with an expanded intensity axis in Fig. 10b of Mills et al. (2012[Mills, S. J., Christy, A. G., Génin, J.-M. R., Kameda, T. & Colombo, F. (2012). Mineral. Mag. 76, 1289-1336.]), and inspection of those patterns for values of 2θ > 30° reveals a striking similarity with a pattern in Drits et al. (1993[Drits, V. A., Sakharov, B. A. & Manceau, A. (1993). Clay Miner. 28, 209-222.]) for feroxyhite i.e. δ-FeOOH. This is illustrated in Fig. 4[link], which compares data that were extracted from Fig. 10b of Mills et al. (2012[Mills, S. J., Christy, A. G., Génin, J.-M. R., Kameda, T. & Colombo, F. (2012). Mineral. Mag. 76, 1289-1336.]) for the sample that has [x = {5\over 6}] with Drits et al.'s pattern for feroxyhite (data converted from Cu Kα to Co Kα). The presence of δ-FeOOH is entirely plausible given that it has been observed previously in experiments that used a similar method of sample preparation (Bernal et al., 1959[Bernal, J. D., Dasgupta, D. & Mackay, A. L. (1959). Clay Mineral. Bull. 4, 15-30.]). The only other large peak on the pattern for [x = {5\over 6}] is at about 13.6° 2θ, which corresponds to a d-spacing of 7.55 Å (Co Kα). This is by far the most intense LDH peak on Fig. 10a of Mills et al. (2012[Mills, S. J., Christy, A. G., Génin, J.-M. R., Kameda, T. & Colombo, F. (2012). Mineral. Mag. 76, 1289-1336.]), and is attributed to the 003 peak of an LDH phase. The next most intense peak (006) would therefore be expected at about 27.43° 2θ (d = 3.77 Å) and there is indeed an indication of a peak at this position. Since the other peaks for an LDH phase would be smaller than the 006 peak, it is reasonable to assume that they would be lost in the noise (the original figure must be viewed to appreciate the extent of the noise because Fig. 4[link] is a plot of the peaks with averaged noise). The pattern for [x = {5\over 6}] is therefore plausibly explained as being due to a mixture of one LDH phase and feroxyhite, rather than to a mixture of two LDH phases, i.e. one with [x = {2\over 3}] (trébeurdenite) and a second with x = 1 (mössbauerite). As a consequence, the validity of mössbauerite seems questionable unless more compelling evidence emerges.
[Figure 4]
Figure 4
XRD pattern for a Fe2+–Fe3+ LDH preparation with x = 0.83 (upper pattern) compared with a pattern for feroxyhite. The data for feroxyhite were extracted from Fig. 1[link] of Drits et al. (1993[Drits, V. A., Sakharov, B. A. & Manceau, A. (1993). Clay Miner. 28, 209-222.]) and those for the LDH preparation were extracted from Fig. 10b of Mills et al. (2012[Mills, S. J., Christy, A. G., Génin, J.-M. R., Kameda, T. & Colombo, F. (2012). Mineral. Mag. 76, 1289-1336.]). The pattern for the latter does not appear noisy when compared with the original because it is a plot of the peaks with averaged noise. The data for feroxyhite were converted from Cu Kα radiation to Co Kα to facilitate comparison.

4. Summary

The sequence of hexagonal ordered distributions of trivalent cations that are possible in the main layer of LDH phases has been clarified – including the composition and supercell parameter – and a plausible explanation has been provided for the observed variation in the lower value of x.

References

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Volume 69| Part 6| December 2013| Pages 629-633
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