:orphan: .. status publishable .. product Crystals .. sectionauthor Volker .. SME Volker .. PR Mikael .. TW Kathy .. date 2026 .. keywords: Crystals, crystalline periodicity, crystal lattice .. _CrystalsDTS: |medea| *Crystals* - The Beauty of Periodicity ---------------------------------------------- .. only:: latex |partofmedeaenv_latex| .. only:: html |partofmedea| .. admonition:: **At-a-Glance** |medea|\ :sup:`®`\ [#TM]_ *Crystals* controls all crystal structure information as specified by the lattice vectors in terms of their lengths and the angles between them, the positions of the atoms in the primitive unit cell in terms of their coordinates, and the space-group symmetry. **Key Benefits** * Full control of all crystal structure information * Symmetry-related atomic positions are automaticlly created * Straightforward modification of initial magnetic moments and isotope masses * Freezing of selected atomic coordinates to suppress atomic displacements in structure relaxations, molecular-dynamics simulations, and phonon calculations .. figure:: /Datasheets/images/Crystals-Escher-Lizard-1942.jpg :width: 80% :align: center M.C. Escher, Lizard, 1942 The unique characteristic, which distinguishes crystals from all other forms of matter, is discrete translational symmetry. This became obvious from the early x-ray diffraction studies, which revealed that most materials form almost perfect periodic arrays at low temperatures [#Friedrich]_\ :sup:`,`\ [#Bragg]_. Of course, crystalline periodicity may be viewed as a purely mathematical concept, and in this respect crystals remind you of paintings of M. C. Escher such as that displayed in the figure above. The mathematical perspective seamlessly leads to the classification of crystals in terms of the well-known 14 Bravais lattices. Each lattice point, *i.e.* each unit cell of the periodic lattice, may comprise not just a single atom but a complex group of atoms. This is just like the basic unit in the painting by Escher, shown in the above figure, which consists of six lizards, two white, two red, and two black. On the theoretical side, translational symmetry of a crystal ultimately originates from the corresponding symmetry of the underlying potential generated by the atomic nuclei and seen by the electrons. This led Bloch to formulate his famous theorem, which reduces the problem of describing the electronic states in a macroscopic crystal to that of electronic states in a microscopic unit cell and thus forms the basis for electronic structure calculations using codes like |medea| |mvasp| [#Bloch]_. :myquote:`The unique characteristic, which distinguishes crystals from all other forms of matter, is discrete translational symmetry.` |medea| *Crystals* controls all information about the Bravais lattice and the internal arrangement of the atoms in the unit cell. This is done by a combination of basic graphical user interfaces, which can be accessed via a side panel available in each structure window. The GUI displayed in the figure below allows to modify the lattice parameters and angles, lower the symmetry, *e.g.*, prior to the insertion of symmetry-breaking defects, and to modify the properties of the atoms. .. figure:: /Datasheets/images/Crystals-GUI-lattice+atoms.png :width: 100% :align: center |medea| *Crystals* Screenshot: Graphical user interface controlling all information about a crystal structure All information about the atoms can be additionally controlled and modified via the Atoms spreadsheet, which can be likewise accessed in the side panel and which is displayed in the following figure. .. figure:: /Datasheets/images/Crystals-GUI-spreadsheet.png :width: 100% :align: center |medea| *Crystals* Screenshot: Atoms spreadsheet collecting and controling all atomic information As an example, the below figure displays the unit cell of FeS\ :sub:`2`\. It crystallizes in a simple cubic lattice with space group Pa-3, which, from a group-theoretical point of view, is exceptional among the 230 space groups [#Bradley]_\ :sup:`,`\ [#Eyert]_. The arrangement of the atoms is characterized by an FeS\ :sub:`6` octahedron at the center of the cube, which is rotated away from the Cartesian axes by about 23\ :sup:`°`, as well as strongly bonded sulfur pairs oriented along the <111> axis. .. figure:: /Datasheets/images/Crystals-FeS2.png :width: 50% :align: center Crystal structure of FeS\ :sub:`2` as generated using |medea| *Crystals* Finally, creation and modification of the crystal structure with |medea| *Crystals* provides the basis for use with a large number of other tools implemented in the computational |medea| |menvironment|, such as |medea| |mvasp|, the |medea| |interfacebuilder|, and the builder tools for surfaces, supercells, and random substitutions. .. add for a column break, adjust where needed .. raw:: latex \newpage Key Features ^^^^^^^^^^^^ * An intuitive user interface controls all parameters affecting the crystal structure, such as the lattice parameters and angles, the atomic positions, and the space group Properties ^^^^^^^^^^ * Three-dimensional crystal structure as specified by the length of the lattice vectors, the angle between them and the positions of the atoms in Cartesian and fractional coordinates. * Initial magnetic moments and isotope masses * Selected suppression of atomic displacements Required Modules ~~~~~~~~~~~~~~~~ * |medea| |menvironment| Related Modules ~~~~~~~~~~~~~~~ * |medea| |infomatica| |mstdenv| * |medea| |geometryanalysis| |mstdenv| * |medea| |interfacebuilder| * |medea| |morphology| * |medea| |amorphousbuilder| * |medea| |munclefull| Find Out More ^^^^^^^^^^^^^ Learn more about |medea| *Crystals* Builder from the Materials Design online video tutorial |youtube03.05|. .. [#TM] |regTMinfo| .. full author list: W. Friedrich, P. Knipping, and M. Laue .. [#Friedrich] W. Friedrich *et al.*, *Ann. Phys.* **346**, 971 (1912) (`DOI `__) .. full author list: W. H. Bragg and W. L. Bragg .. [#Bragg] W. H. Bragg *et al.*, *Proc. Royal Soc. Lond. A* **88**, 428 (1913) (`DOI `__) .. [#Bloch] F. Bloch, *Z. Phys.* **52**, 555 (1929) (`DOI `__) .. full author list: C. J. Bradley and A. P. Cracknell .. [#Bradley] C. J. Bradley *et al.*, *The Mathematical Theory of Symmetry in Solids* (Clarendon Press, Oxford, 1972) .. full author list: V. Eyert, K.-H. Höck, S. Fiechter, and H. Tributsch .. [#Eyert] V. Eyert *et al.*, *Phys. Rev. B* **57**, 6350 (1998) (`DOI `__) .. only:: html :download: :download:`pdf `