1. Introduction

In 2005, FIZ Karlsruhe (Fachinformationszentrum Karlsruhe) began to introduce structure types into the Inorganic Crystal Structure Database ICSD (Bergerhoff et al., 1983; ICSD, 2007). Technically, this was done by introducing new standard remarks (labels) into the database, called TYP and STP, which can be assigned to any entry – and subsequently be searched for. Each subset of entries, belonging to a given TYP label, is represented by one arbitrarily chosen member of this subset in order to serve as the prototype. This representative entry is in addition labelled by a STP remark.

Since the existing theoretical approaches to the definition of structure types (Parthé & Gelato, 1984, 1985; Burzlaff & Malinovsky, 1997; Bergerhoff et al., 1999) already pointed at the difficulties one encounters when trying to determine structure types automatically, methods needed to be developed in order to be able to assign crystal structures contained in the ICSD to their corresponding structure types. This problem is also discussed in the first volume of structure types by Villars & Cenzual (2004).

The report of the IUCr Commission on Crystallographic Nomenclature entitled Nomenclature of Inorganic Structure Types (Lima-de-Faria et al., 1990) provides some useful definitions of the different kinds of structure types. The two most important of them – isopointal and isoconfigurational structures – proved to be sufficient to serve as theoretical concepts in guiding our practical work with the ICSD database. According to Lima-de Faria et al., two structures should be described as isopointal if:

(i) they have the same space-group type or belong to a pair of enantiomorphic space-group types; and

(ii) the atomic positions, occupied either fully or partially at random, are the same in the two structures, i.e. the complete sequence of the occupied Wyckoff positions (including the number of times each Wyckoff position is occupied) is the same for the two structures when the structural data have been standardized.

Note that, for not uniquely standardized structures, the Wyckoff sequence depends on the chosen cell origin, e.g. for those spinels crystallizing in space group Iad (with two standard settings with the origin chosen at or ), a shift of the origin (or alternatively of all atomic positions) by ½½½ will change the Wyckoff sequence from `e d a' into `e c b', respectively.

Lima-de-Faria et al. define `isoconfigurational structures' as a subgroup of the isopointal structures, viz two structures are defined as isoconfigurational (configurationally isotypic) if:

(i) they are isopointal; and

(ii) for all corresponding Wyckoff positions, both the crystallographic point configurations (crystallographic orbits) and their geometrical interrelationships are similar.

Unfortunately, definition (ii) is not an explicit and constructive definition since the exact meaning of `similar geometric interrelationships' is not specified (Parthé & Gelato, 1984, 1985; Burzlaff & Malinovsky, 1997; Bergerhoff et al., 1999), and thus novel methods that combine different criteria needed to be introduced. According to Lima-de-Faria et al. (1990), we use an a priori definition of geometric criteria for distinguishing structure families.

The main body of this paper consists of three parts. In the next section, we will discuss the search criteria introduced in order to determine all those entries in the ICSD which belong to a given structure type. The third section covers some typical examples and the final section is devoted to a discussion and a brief outlook.

2. Search criteria (structure descriptors)

2.1. General description

In the ICSD, two crystal structures are regarded as isostructural if they are isoconfigurational. Note that for zeolite crystal structures only the framework atoms (Baer­locher et al., 2001) are taken into account in the determination of isoconfigurational structures.¹ Such types will get the ending `-frame'.

In detail, our approach for the determination of isocon­figurational structures consists of the following two steps.

1. Determination of isopointal structure types characterized by space group, Wyckoff sequence and Pearson symbol. As we use the data `as-published', all non-standard settings are considered separately, i.e. all space-group settings and all equivalent Wyckoff sequences that are used by the authors are taken into consideration.

2. Subdivision of isopointal [characterized by definition (i)] structures into different structure types by additional `structural descriptors'.

These are the fundamental steps in the determination of structure types in the ICSD database. At the beginning of our work, we focused on the introduction of structure types with high symmetry (cubic, tetragonal). It soon became evident that for this approach one must be able to manage a large amount of data in a well defined, systematic, reproducible and fast way as nowadays is provided by the use of up-to-date relational database techniques. Especially using the powerful `structured query language' (SQL) as a workhorse – embedded within the relational database management system MySQL, which in fact stores the complete ICSD data – turned out to be essential (Reese et al., 2002).

For the purpose of classification, i.e. the subdivision of isopointal structures, we had to consider further criteria (the structure descriptors) that define a structure type uniquely. It was indispensable to develop an easy-to-use database application tool with integrated MySQL database connectivity and full data access. Fig. 1 shows this tool providing a fast and highly automated process.

Figure 1 Part of the search list for structure types in the ICSD. Because atomic coordinates are not introduced in the search criteria, the representatives of the PdF2- and CO2-type cannot be distinguished from the FeS2(pyrite)-type automatically and must be set by hand.

1. Recording all of the search criteria by their (alpha)numerical values and persistent storing into a suitable table. The grid in Fig. 1 shows the structure of this table.

2. Allowing an automated robust search of entries over the whole database – by generating the search conditions using the criteria stored in step 1 – and a subsequent comparison of the crystal structures found in the resulting search subsets.

3. Searching for intersections due to overlaps in search conditions (defined in step 1) automatically by running an appropriate SQL routine and subsequently resolving the found overlaps of structure types by fine-tuning of criteria.

4. Ultimately assigning structure types, i.e. labelling all entries of the whole database that match the criteria for all defined structure types (in step 1) with TYP or STP remarks, respectively. This indeed takes less than half an hour for about 100000 entries and 2485 distinct structure types, owing to the highly performing SQL engine of the database. In release 2007-2, about 59% of all the entries could uniquely be assigned to a structure type.

While our work continues on introducing further structure types, these four steps serve as the actual work flow for the production of each release again (twice a year). The progress over the past years in introducing structure types into the ICSD is visualized in Table 1.

Table 1 Progress in introducing structure types in the ICSD Release STP† TYP‡ (%)§ Total entries (100%) 2005-01 107 15874 18.4 86308 2005-02 109 16872 18.9 89384 2006-01 802 32970 37.0 89064¶ 2006-02 1347 40170 42.9 93720 2007-01 1600 50717 52.1 97376 2007-2 2485 59291 59.1 100243 †Number of entries labelled with a STP remark, i.e. number of distinct structure types introduced. ‡Number of entries labelled with a TYP remark, i.e. number of entries assigned to any structure type §Percentage of the number of entries labelled with a TYP remark referring to the total amount of entries ¶In 2006-01, about 3000 duplicates were removed from the ICSD.

For the large majority of entries it proved to be sufficient to use the following criteria.

For the definition of isopointal structure types:

(i) equivalent space groups (or space-group number);

(ii) equivalent Wyckoff sequences;

(iii) the Pearson symbol.

For the subdivision into individual isoconfigurational structure types, the criteria:

(iv) crystallographic composition type (ANX formula);

(v) range of c/a ratios;

(vi) beta range;

(vii) necessary elements (combined by `and' or `or');

(viii) forbidden elements (also combined by `and' or `or');

(ix) atomic coordinates (by manual inspection, in a few cases only).

Which of the criteria (iv)–(vii) are actually used in order to define a special structure type is determined by a semiautomatic, and often iterative, trial-and-error procedure until the chosen descriptors for a given structure type suffice to obtain all representatives and only these representatives. Exactly this attempt of uniquely assigning all the representatives in the ICSD for a given structure type means a lot of hard pragmatic (iterative) work and indeed makes the difference between our approach and approaches that mainly rely on the definition of structure types only. The criteria (vii) and (viii) take into consideration the crystal chemistry: some elements occur in all representatives of a given type (e.g. O in oxide structures or F, Cl, Br, I in halides), whereas in intermetallics O is a `forbidden' element.

When the assignment of structure types is completed, the user of the ICSD can ask for all representatives of a structure type without bothering with all the different settings of space groups and cell origins because this is already done. In our effort to introduce structure types, we tried to cope with all the different settings, but some unusual settings may have been overlooked. Users of the ICSD who find a missing representative of an already introduced structure type are requested to inform FIZ Karlsruhe or the first author. Many of the remaining structures represent their own singular structure type (about 1/3 of all structures in the ICSD) and will not be registered as a structure type.

In a few cases only, these criteria do not suffice for a clear separation and then, as the ultimate and time-consuming step, the representatives of such a structure type must be set by hand, e.g. by checking the atomic coordinates. Fields `Include' and `Exclude' are used for this purpose.

3. Examples

In some cases, all isopointal structures belong to one single isoconfigurational structure type only, e.g. the spinels in space group Fdm. The space-group number (227), the Pearson symbol (cF56) and the two equivalent Wyckoff sequences (e d a and e c b) are sufficient to find all 1890 spinel structures present in the ICSD (1878 for `e d a' and 12 for `e c b', TYP = `Al2MgO4', COL number of the prototype: 56116).

As a supplementary criterion, the c/a range was used to separate ThSi₂ (Th surrounded by 12 Si) and TiO₂(tI12) (Ti octahedrally surrounded by six O atoms) in space group I4₁/amd (No. 141), Pearson symbol tI12 and Wyckoff sequence `e a' or `e b'. For c/a = 2.11–2.99, one gets 15 (e a) + 12 (e b) = 27 representatives for TiO₂(tI12) and for the ThSi₂-type with c/a = 2.99–4.14, one obtains 75(e a) + 2(e b) = 77 representatives.

Chemical information was needed to separate CoW₂B₂ and K₂PtS₂ in Immm, Pearson symbol oI10 and Wyckoff sequence `h f a'. With necessary elements B or Si (and c/a = 0.4–0.5), one gets seven representatives of the intermetallic CoW₂B₂-type and with elements O or S or Se six representatives of the K₂PtS₂-type are obtained.

Finally, we would like to mention that isopointal structure types in space groups with a small number of Wyckoff letters tend to split into many structure types. E.g., for the isopointal structures that are characterized by space-group symbol P12₁/c1 (No. 14), Pearson symbol mP12 and Wyckoff sequence e3, 145 structures are found. Until now, 98 of them could be assigned to the following six structure types:

CeAsS (4 structures) with c/a ratio = 4–4.8;

CoSb₂ (18) with β range = 111–120°, pnictide element (except nitrogen) necessary;

CuP₂ (2) with β = 110–115°, Cu or Ag necessary;

ZrO₂(mP) (68) with c/a = 0.92–1.1, β = 90–104°, O or S necessary;

NdAs₂ (2) with β = 105–107°, P or As or Sb necessary, O forbidden;

CaPSi (4) setting P121/n1 only, β = 106–110°.

For the last example, the 145 isopointal structures were at first standardized by STRUCTURE TIDY. The clustering of the standardization parameters (γ and CG) as well as the β angles around certain values were taken as an indication for a structure type. Then those criteria were chosen that clearly could separate all these clusters.

4. Discussion and outlook

For intermetallic phases, Villars & Calvert (1991, 1997) have compiled extensive lists of structure types and their representatives. A first compendium of structure types including ionic structures too (TYPIX) was published by Parthé et al. (1993) with more than 3600 critically evaluated data sets. In 2003, Villars & Cenzual started their voluminous compendium in book form.

Bergerhoff et al. (1999) have introduced a simple procedure to compare pairs of isoconfigurational structures. The product of the differences of standardized atomic coordinates and the ratios of lattice constants results in the so-called Δ value. The smaller Δ, the better the two structures coincide. Application of this procedure for the determination of structure types would require standardized structures and is a complementary tool to the methods introduced in this publication. Alternatively, one could think of classifying the crystal structures according the group–subgroup relationship, and families of structures types could be identified systematically (Megaw, 1973; Bärnighausen, 1980; International Tables for Crystallography, 2004). In such a scheme, the structure type with the highest symmetry would be the aristotype and by deleting some symmetry elements one would arrive at the hettotypes.⁶ Clearly the systematic treatments of these topics are a very interesting piece of work for the future, but are beyond the scope of the current work.

For the zeolite-type structures, the group–subgroup relations in the form of Bärnighausen trees have already been published by Baur & Fischer (2000–2006).