Hexagonal crystal family

(Redirected from Rhombohedral crystal system)
Crystal system Trigonal Hexagonal
Lattice system
Rhombohedral

Hexagonal
Example
Dolomite (white)

α-Quartz

Beryl

In crystallography, the hexagonal crystal family is one of the six crystal families, which includes two crystal systems (hexagonal and trigonal) and two lattice systems (hexagonal and rhombohedral). While commonly confused, the trigonal crystal system and the rhombohedral lattice system are not equivalent (see section crystal systems below).[1] In particular, there are crystals that have trigonal symmetry but belong to the hexagonal lattice (such as α-quartz).

The hexagonal crystal family consists of the 12 point groups such that at least one of their space groups has the hexagonal lattice as underlying lattice, and is the union of the hexagonal crystal system and the trigonal crystal system.[2] There are 52 space groups associated with it, which are exactly those whose Bravais lattice is either hexagonal or rhombohedral.

Lattice systems

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The hexagonal crystal family consists of two lattice systems: hexagonal and rhombohedral. Each lattice system consists of one Bravais lattice.

 
Relation between the two settings for the rhombohedral lattice
Hexagonal crystal family
Bravais lattice Hexagonal Rhombohedral
Pearson symbol hP hR
Hexagonal
unit cell
   
Rhombohedral
unit cell
   

In the hexagonal family, the crystal is conventionally described by a right rhombic prism unit cell with two equal axes (a by a), an included angle of 120° (γ) and a height (c, which can be different from a) perpendicular to the two base axes.

The hexagonal unit cell for the rhombohedral Bravais lattice is the R-centered cell, consisting of two additional lattice points which occupy one body diagonal of the unit cell. There are two ways to do this, which can be thought of as two notations which represent the same structure. In the usual so-called obverse setting, the additional lattice points are at coordinates (23, 13, 13) and (13, 23, 23), whereas in the alternative reverse setting they are at the coordinates (13,23,13) and (23,13,23).[3] In either case, there are 3 lattice points per unit cell in total and the lattice is non-primitive.

The Bravais lattices in the hexagonal crystal family can also be described by rhombohedral axes.[4] The unit cell is a rhombohedron (which gives the name for the rhombohedral lattice). This is a unit cell with parameters a = b = c; α = β = γ ≠ 90°.[5] In practice, the hexagonal description is more commonly used because it is easier to deal with a coordinate system with two 90° angles. However, the rhombohedral axes are often shown (for the rhombohedral lattice) in textbooks because this cell reveals the 3m symmetry of the crystal lattice.

The rhombohedral unit cell for the hexagonal Bravais lattice is the D-centered[1] cell, consisting of two additional lattice points which occupy one body diagonal of the unit cell with coordinates (13, 13, 13) and (23, 23, 23). However, such a description is rarely used.

Crystal systems

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Crystal system Required symmetries of point group Point groups Space groups Bravais lattices Lattice system
Trigonal 1 threefold axis of rotation 5 7 1 Rhombohedral
18 1 Hexagonal
Hexagonal 1 sixfold axis of rotation 7 27

The hexagonal crystal family consists of two crystal systems: trigonal and hexagonal. A crystal system is a set of point groups in which the point groups themselves and their corresponding space groups are assigned to a lattice system (see table in Crystal system#Crystal classes).

The trigonal crystal system consists of the 5 point groups that have a single three-fold rotation axis, which includes space groups 143 to 167. These 5 point groups have 7 corresponding space groups (denoted by R) assigned to the rhombohedral lattice system and 18 corresponding space groups (denoted by P) assigned to the hexagonal lattice system. Hence, the trigonal crystal system is the only crystal system whose point groups have more than one lattice system associated with their space groups.

The hexagonal crystal system consists of the 7 point groups that have a single six-fold rotation axis. These 7 point groups have 27 space groups (168 to 194), all of which are assigned to the hexagonal lattice system.

Trigonal crystal system

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The 5 point groups in this crystal system are listed below, with their international number and notation, their space groups in name and example crystals.[6][7][8]

Space group no. Point group Type Examples Space groups
Name[1] Intl Schoen. Orb. Cox. Hexagonal Rhombohedral
143–146 Trigonal pyramidal 3 C3 33 [3]+ enantiomorphic polar carlinite, jarosite P3, P31, P32 R3
147–148 Rhombohedral 3 C3i (S6) [2+,6+] centrosymmetric dolomite, ilmenite P3 R3
149–155 Trigonal trapezohedral 32 D3 223 [2,3]+ enantiomorphic abhurite, alpha-quartz (152, 154), cinnabar P312, P321, P3112, P3121, P3212, P3221 R32
156–161 Ditrigonal pyramidal 3m C3v *33 [3] polar schorl, cerite, tourmaline, alunite, lithium tantalate P3m1, P31m, P3c1, P31c R3m, R3c
162–167 Ditrigonal scalenohedral 3m D3d 2*3 [2+,6] centrosymmetric antimony, hematite, corundum, calcite, bismuth P31m, P31c, P3m1, P3c1 R3m, R3c

Hexagonal crystal system

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The 7 point groups (crystal classes) in this crystal system are listed below, followed by their representations in Hermann–Mauguin or international notation and Schoenflies notation, and mineral examples, if they exist.[2][9]

Space group no. Point group Type Examples Space groups
Name[1] Intl Schoen. Orb. Cox.
168–173 Hexagonal pyramidal 6 C6 66 [6]+ enantiomorphic polar nepheline, cancrinite P6, P61, P65, P62, P64, P63
174 Trigonal dipyramidal 6 C3h 3* [2,3+] cesanite, laurelite P6
175–176 Hexagonal dipyramidal 6/m C6h 6* [2,6+] centrosymmetric apatite, vanadinite P6/m, P63/m
177–182 Hexagonal trapezohedral 622 D6 226 [2,6]+ enantiomorphic kalsilite, beta-quartz P622, P6122, P6522, P6222, P6422, P6322
183–186 Dihexagonal pyramidal 6mm C6v *66 [6] polar greenockite, wurtzite[10] P6mm, P6cc, P63cm, P63mc
187–190 Ditrigonal dipyramidal 6m2 D3h *223 [2,3] benitoite P6m2, P6c2, P62m, P62c
191–194 Dihexagonal dipyramidal 6/mmm D6h *226 [2,6] centrosymmetric beryl P6/mmm, P6/mcc, P63/mcm, P63/mmc

The unit cell volume is given by a2c•sin(60°)

Hexagonal close packed

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Hexagonal close packed (hcp) unit cell

Hexagonal close packed (hcp) is one of the two simple types of atomic packing with the highest density, the other being the face-centered cubic (fcc). However, unlike the fcc, it is not a Bravais lattice, as there are two nonequivalent sets of lattice points. Instead, it can be constructed from the hexagonal Bravais lattice by using a two-atom motif (the additional atom at about (231312)) associated with each lattice point.[11]

Multi-element structures

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Compounds that consist of more than one element (e.g. binary compounds) often have crystal structures based on the hexagonal crystal family. Some of the more common ones are listed here. These structures can be viewed as two or more interpenetrating sublattices where each sublattice occupies the interstitial sites of the others.

Wurtzite structure

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Wurtzite unit cell as described by symmetry operators of the space group.[12]
 
Another representation of the wurtzite unit cell[citation needed]
 
Another representation of the wurtzite structure[citation needed]

The wurtzite crystal structure is referred to by the Strukturbericht designation B4 and the Pearson symbol hP4. The corresponding space group is No. 186 (in International Union of Crystallography classification) or P63mc (in Hermann–Mauguin notation). The Hermann-Mauguin symbols in P63mc can be read as follows:[13]

  • 63.. : a six fold screw rotation around the c-axis
  • .m. : a mirror plane with normal {100}
  • ..c : glide plane in the c-directions with normal {120}.

Among the compounds that can take the wurtzite structure are wurtzite itself (ZnS with up to 8% iron instead of zinc), silver iodide (AgI), zinc oxide (ZnO), cadmium sulfide (CdS), cadmium selenide (CdSe), silicon carbide (α-SiC), gallium nitride (GaN), aluminium nitride (AlN), boron nitride (w-BN) and other semiconductors.[14] In most of these compounds, wurtzite is not the favored form of the bulk crystal, but the structure can be favored in some nanocrystal forms of the material.

In materials with more than one crystal structure, the prefix "w-" is sometimes added to the empirical formula to denote the wurtzite crystal structure, as in w-BN.

Each of the two individual atom types forms a sublattice which is hexagonal close-packed (HCP-type). When viewed all together, the atomic positions are the same as in lonsdaleite (hexagonal diamond). Each atom is tetrahedrally coordinated. The structure can also be described as an HCP lattice of zinc with sulfur atoms occupying half of the tetrahedral voids or vice versa.

The wurtzite structure is non-centrosymmetric (i.e., lacks inversion symmetry). Due to this, wurtzite crystals can (and generally do) have properties such as piezoelectricity and pyroelectricity, which centrosymmetric crystals lack.[citation needed]

Nickel arsenide structure

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The nickel arsenide structure consists of two interpenetrating sublattices: a primitive hexagonal nickel sublattice and a hexagonal close-packed arsenic sublattice. Each nickel atom is octahedrally coordinated to six arsenic atoms, while each arsenic atom is trigonal prismatically coordinated to six nickel atoms.[15] The structure can also be described as an HCP lattice of arsenic with nickel occupying each octahedral void.

Compounds adopting the NiAs structure are generally the chalcogenides, arsenides, antimonides and bismuthides of transition metals. [citation needed]

 
The unit cell of nickeline

The following are the members of the nickeline group:[16]

  • Achavalite: FeSe
  • Breithauptite: NiSb
  • Freboldite: CoSe
  • Kotulskite: Pd(Te,Bi)
  • Langistite: (Co,Ni)As
  • Nickeline: NiAs
  • Sobolevskite: Pd(Bi,Te)
  • Sudburyite: (Pd,Ni)Sb

In two dimensions

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There is only one hexagonal Bravais lattice in two dimensions: the hexagonal lattice.

Bravais lattice Hexagonal
Pearson symbol hp
Unit cell  

See also

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References

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  1. ^ a b c d Hahn, Theo, ed. (2005). International tables for crystallography (5th ed.). Dordrecht, Netherlands: Published for the International Union of Crystallography by Springer. ISBN 978-0-7923-6590-7.
  2. ^ a b Dana, James Dwight; Hurlbut, Cornelius Searle (1959). Dana's Manual of Mineralogy (17th ed.). New York: Chapman Hall. pp. 78–89.
  3. ^ Edward Prince (2004). Mathematical Techniques in Crystallography and Materials Science. Springer Science & Business Media. p. 41.
  4. ^ "Medium-Resolution Space Group Diagrams and Tables". img.chem.ucl.ac.uk.
  5. ^ Ashcroft, Neil W.; Mermin, N. David (1976). Solid State Physics (1st ed.). Holt, Rinehart and Winston. p. 119. ISBN 0-03-083993-9.
  6. ^ Pough, Frederick H.; Peterson, Roger Tory (1998). A Field Guide to Rocks and Minerals. Houghton Mifflin Harcourt. p. 62. ISBN 0-395-91096-X.
  7. ^ Hurlbut, Cornelius S.; Klein, Cornelis (1985). Manual of Mineralogy (20th ed.). Wiley. pp. 78–89. ISBN 0-471-80580-7.
  8. ^ "Crystallography and Minerals Arranged by Crystal Form". Webmineral.
  9. ^ "Crystallography". Webmineral.com. Retrieved 2014-08-03.
  10. ^ "Minerals in the Hexagonal crystal system, Dihexagonal Pyramidal class (6mm)". Mindat.org. Retrieved 2014-08-03.
  11. ^ Jaswon, Maurice Aaron (1965-01-01). An introduction to mathematical crystallography. American Elsevier Pub. Co.
  12. ^ De Graef, Marc; McHenry, Michael E. (2012). Structure of Materials; An introduction to Crystallography, Diffraction and Symmetry (PDF). Cambridge University Press. p. 16.
  13. ^ Hitchcock, Peter B (1988). International tables for crystallography volume A.
  14. ^ Togo, Atsushi; Chaput, Laurent; Tanaka, Isao (2015-03-20). "Distributions of phonon lifetimes in Brillouin zones". Physical Review B. 91 (9): 094306. arXiv:1501.00691. Bibcode:2015PhRvB..91i4306T. doi:10.1103/PhysRevB.91.094306. S2CID 118851924.
  15. ^ Inorganic Chemistry by Duward Shriver and Peter Atkins, 3rd Edition, W.H. Freeman and Company, 1999, pp.47,48.
  16. ^ http://www.mindat.org/min-2901.html Mindat.org
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