Crystal system
In crystallography, a crystal system is one of the seven categories into which the lattices of crystalline solids are classified based on their rotational symmetry elements and the geometric parameters of their unit cells, providing a foundational framework for describing atomic arrangements in materials.[1] These systems distinguish crystals by the relationships among the unit cell edge lengths (a, b, c) and interaxial angles (α, β, γ), reflecting the underlying symmetry that governs physical properties such as optical behavior, cleavage, and mechanical strength.[2] The seven crystal systems, listed in order of increasing symmetry, are triclinic, monoclinic, orthorhombic, tetragonal, trigonal, hexagonal, and cubic.[1] Each system is defined by specific symmetry constraints: for instance, the triclinic system has no rotational symmetry beyond translations, with all parameters unequal (a ≠ b ≠ c; α ≠ β ≠ γ), while the cubic system exhibits the highest symmetry, with equal edges and right angles (a = b = c; α = β = γ = 90°).[1] The tetragonal and hexagonal systems feature fourfold and sixfold rotational axes, respectively, along the c-direction, influencing applications in materials like quartz (trigonal) for piezoelectric devices.[3][4] Crystal systems form the basis for higher-level classifications in crystallography, including the 14 Bravais lattices, which account for additional centering types (primitive, body-centered, face-centered, base-centered) within each system.[3] When combined with the 32 crystallographic point groups—describing finite symmetry operations—these yield the 230 space groups, which fully specify the symmetry of crystal structures including translations and glide planes.[3] This hierarchical organization is essential for fields like materials science, where identifying a crystal's system aids in predicting properties and designing advanced materials such as semiconductors and pharmaceuticals.[5]Fundamentals
Definition and symmetry
A crystal system is a classification in crystallography that groups crystalline structures based on their symmetry, particularly the equivalence of rotational symmetry axes and the angles between them within the unit cell. There are seven crystal systems: triclinic, monoclinic, orthorhombic, tetragonal, trigonal, hexagonal, and cubic. This categorization reflects shared constraints on the unit cell's geometry and symmetry operations that leave the lattice invariant.[1] Central to this classification are symmetry elements, including rotation axes, mirror planes, and inversion centers, which dictate the possible arrangements of atoms in a periodic lattice. Rotation axes permit the crystal to be rotated by 360°/n (where n = 1, 2, 3, 4, or 6) around a line and appear unchanged; higher or odd orders beyond these are incompatible with crystal periodicity. Mirror planes enable reflection across a plane, mapping the structure onto itself, while inversion centers involve point symmetry where every atom maps to an equivalent position at equal distance on the opposite side. These elements collectively define system boundaries by limiting the combinations that can occur without violating translational symmetry.[6] The criteria for assigning a crystal to a system involve the unit cell parameters—the edge lengths a, b, c and interaxial angles α (between b and c), β (between a and c), γ (between a and b)—along with the presence of compatible symmetry elements. For instance, the cubic system requires a = b = c and α = β = γ = 90°, supporting high symmetry such as four 3-fold rotation axes parallel to the body diagonals ⟨111⟩. Conversely, the triclinic system imposes no metric constraints (a ≠ b ≠ c; α ≠ β ≠ γ), allowing only trivial symmetry like a 1-fold rotation (identity) or an inversion center, resulting in the lowest overall symmetry. Intermediate cases include the orthorhombic system, where α = β = γ = 90° but a ≠ b ≠ c, defined by three mutually perpendicular 2-fold rotation axes. These relations ensure that crystals within each system exhibit equivalent macroscopic properties tied to their symmetry.[1]Historical development
The classification of crystal systems originated in the late 18th century with René Just Haüy's pioneering work, which linked the external morphology of crystals to their internal geometric structure through the concept of integral molecules arranged in repeating polyhedral units. In his 1784 publication Essai d'une théorie sur la structure des cristaux, Haüy proposed that crystals are built from small, identical parallelepiped building blocks, establishing the foundational idea that crystal forms arise from underlying atomic arrangements and symmetry laws.[7] This theory marked the birth of geometric crystallography, shifting focus from mere description to a systematic understanding of crystal geometry. Advancements in the 19th century built on Haüy's ideas, with Auguste Bravais identifying the 14 possible lattice types in three dimensions in his 1850 memoir Mémoire sur les systèmes formés par des points disposés régulièrement sur un plan ou dans l'espace. Bravais's work demonstrated that only these lattice configurations could generate the observed symmetries in crystals, providing a mathematical framework for infinite periodic arrays.[7] Toward the end of the century, Arthur Schönflies and Evgraf Stepanovich Fedorov independently classified the 32 crystallographic point groups in 1891 using group theory, enumerating all possible finite symmetry operations compatible with translational periodicity.[8] These classifications laid the groundwork for understanding how rotational symmetries combine with lattice translations to form crystal structures.[9] The early 20th century saw transformative influences from experimental techniques, particularly the discovery of X-ray diffraction by crystals. In 1912, Max von Laue demonstrated that X-rays produce diffraction patterns when passed through crystals, confirming their wave nature and enabling direct probing of atomic arrangements within crystal lattices.[10] Building on this, William Henry Bragg and William Lawrence Bragg developed the Bragg law in 1913, which quantitatively related diffraction angles to interplanar spacings, allowing verification and refinement of crystal system classifications through atomic-scale evidence.[11] These breakthroughs resolved longstanding debates, such as the distinction between metric-based lattice systems (focusing on unit cell dimensions and angles) and symmetry-based crystal systems (emphasizing point group operations), which became clearly delineated in 20th-century literature.[7] Further standardization occurred with the publication of the International Tables for Crystallography in 1935, which formalized the seven crystal systems based on the holohedral symmetry elements of their respective point groups, providing a comprehensive reference for global crystallographic practice.[12] Subsequent editions refined these systems, integrating X-ray data to solidify the modern framework where crystal systems are defined by their maximal symmetry (holohedry) rather than solely metric properties.[13] This evolution from geometric intuition to empirically verified symmetry classifications has underpinned contemporary crystallography.[14]Classifications
Lattice systems
Lattice systems provide a metric classification of the 14 Bravais lattices in three-dimensional space, grouping them according to constraints on the unit cell edge lengths (a, b, c) and interaxial angles (α, β, γ) without considering point group symmetries. This approach yields seven lattice systems—triclinic, monoclinic, orthorhombic, tetragonal, rhombohedral, hexagonal, and cubic—emphasizing geometric similarities to facilitate analysis in crystallography.[1][3] In the triclinic lattice system, the unit cell exhibits the lowest metric symmetry, with all edge lengths unequal (a ≠ b ≠ c) and all angles arbitrary (α ≠ β ≠ γ). This system accommodates only the primitive Bravais lattice, requiring six independent parameters to fully describe the cell.[1] The monoclinic lattice system imposes partial orthogonality, featuring unequal edge lengths (a ≠ b ≠ c) and two right angles (α = γ = 90°), while the angle β ≠ 90°. It includes two Bravais lattices: primitive and base-centered (on the b-face).[1] Orthorhombic lattices display full orthogonality with unequal edge lengths (a ≠ b ≠ c) and all right angles (α = β = γ = 90°). This system supports the greatest variety of Bravais lattices among the seven, namely primitive, base-centered (on c-face), body-centered, and face-centered.[1] Tetragonal lattices maintain orthogonality with equal basal edges (a = b ≠ c) and all right angles (α = β = γ = 90°), reducing the independent parameters to two. Representative Bravais lattices in this system are primitive and body-centered.[3] Rhombohedral lattices feature equal edge lengths (a = b = c) and equal non-right angles (α = β = γ ≠ 90°). This system includes only the primitive Bravais lattice, with three independent parameters.[1] Hexagonal lattices have equal basal edges (a = b ≠ c), with α = β = 90° and γ = 120°. They accommodate the primitive Bravais lattice, requiring two independent parameters.[1] Cubic lattices exhibit the highest metric symmetry, with equal edges (a = b = c) and all right angles (α = β = γ = 90°), reducing parameters to one. This system includes three Bravais lattices: primitive, body-centered, and face-centered.[3] These systems enable simplified grouping of Bravais lattices by dimensional similarity, proving essential in materials science for tasks such as unit cell refinement and pattern indexing in powder diffraction, where full symmetry may not be immediately resolvable.[15]Crystal systems
Crystal systems classify crystalline materials according to their rotational symmetries and corresponding unit cell geometries, resulting in seven distinct categories that dictate the possible arrangements of atoms in a lattice. These systems are distinguished primarily by the presence of specific symmetry axes and planes, with each defined by its holohedral point group—the highest symmetry class within that system—which imposes constraints on the unit cell parameters a, b, c (edge lengths) and \alpha, \beta, \gamma (interaxial angles). The lattice systems provide the metric foundation, but crystal systems integrate these with point group symmetries to fully characterize the structural diversity observed in minerals and other solids. The triclinic system exhibits the lowest symmetry, lacking any rotational axes or mirror planes in its holohedral form, represented by the point group \bar{1}. Its unit cell has no restrictions, described by a \neq b \neq c, \alpha \neq \beta \neq \gamma \neq 90^\circ. This results in highly anisotropic properties, with directions of varying physical characteristics. A representative mineral is feldspar (such as microcline), where the irregular unit cell leads to cleavage planes that reflect the low symmetry.[16][15][17] In the monoclinic system, the holohedral point group $2/m introduces a single twofold rotation axis or mirror plane, often aligned with the b-axis. The unit cell metrics are a \neq b \neq c, \alpha = \gamma = 90^\circ, \beta \neq 90^\circ. This partial symmetry produces moderate anisotropy, evident in minerals like gypsum, which forms prismatic or tabular crystals with a distinct cleavage direction perpendicular to the b-axis.[16][15][17] The orthorhombic system features three mutually perpendicular twofold axes or mirror planes in its holohedral point group mmm, yielding a rectangular unit cell with a \neq b \neq c, \alpha = \beta = \gamma = 90^\circ. This configuration allows for anisotropy along the three principal directions but isotropy within planes perpendicular to each axis. Topaz exemplifies this system, displaying perfect cleavage parallel to the c-axis due to the orthogonal symmetry.[16][15][17] For the tetragonal system, the holohedral point group $4/mmm includes a fourfold rotation axis along the c-direction, with unit cell parameters a = b \neq c, \alpha = \beta = \gamma = 90^\circ. The equal a and b edges promote cylindrical symmetry around the c-axis, leading to properties that vary radially but uniformly along the axis. Zircon, a common gem mineral, illustrates this with its elongated prismatic habit and tetragonal dipyramidal forms.[16][15][17] The trigonal (or rhombohedral) system is defined by the holohedral point group \bar{3}m, featuring a threefold rotation axis, often described in a rhombohedral setting with a = b = c, \alpha = \beta = \gamma \neq 90^\circ. This equilateral but oblique unit cell results in threefold rotational symmetry, causing anisotropic behavior with a preferred direction along the axis. Quartz serves as a classic example, its trigonal symmetry producing hexagonal-like prisms with rhombohedral terminations and piezoelectric properties tied to the symmetry.[16][15][17] In the hexagonal system, the holohedral point group $6/mmm incorporates a sixfold rotation axis, with unit cell metrics a = b \neq c, \alpha = \beta = 90^\circ, \gamma = 120^\circ. The 120° angle in the basal plane enhances the rotational symmetry, leading to hexagonal habits and radial isotropy in the plane perpendicular to the c-axis. Graphite exemplifies this, its layered structure aligning with the hexagonal symmetry to exhibit basal cleavage and anisotropy between layers.[16][15][17] The cubic system possesses the highest symmetry, governed by the holohedral point group m\bar{3}m with four threefold axes along body diagonals. Its unit cell is a = b = c, \alpha = \beta = \gamma = 90^\circ, enabling full isotropy in physical properties like refractive index and thermal expansion. Diamond represents this system, its tetrahedral coordination and cubic symmetry yielding exceptional hardness and light dispersion uniform in all directions.[16][15][17]Crystal families
In crystallography, crystal families represent the six maximal symmetry classes that organize point groups and space groups according to their holohedral point groups, which are the full symmetry groups of the corresponding lattices. These families provide a hierarchical framework for classifying the 230 three-dimensional space groups, emphasizing shared symmetry elements over metric differences in unit cell parameters. Each family corresponds to one holohedral point group, serving as the highest symmetry within its grouping. The six crystal families are triclinic (holohedry \bar{1}), monoclinic (holohedry $2/m), orthorhombic (holohedry mmm), tetragonal (holohedry $4/mmm), hexagonal (holohedry $6/mmm), and cubic (holohedry m\bar{3}m). The trigonal system is incorporated into the hexagonal family because its point groups are subgroups of the $6/mmm holohedry, allowing structures to be described equivalently on rhombohedral or hexagonal lattices without altering the fundamental symmetry classification; the other families each stand alone with distinct holohedries. This merger reduces the seven crystal systems to six families for nomenclature purposes. In the International Tables for Crystallography, crystal families are denoted by single-letter symbols in Hermann–Mauguin notation: a for triclinic, m for monoclinic, o for orthorhombic, t for tetragonal, h for hexagonal, and c for cubic. These symbols appear in space-group designations and tables, such as P4/mmm for the holohedral space group of the tetragonal family (family number 4 in some listings). This nomenclature standardizes the organization of space groups by family, facilitating quick identification of symmetry relations.[18][19] The use of crystal families streamlines space-group assignment during structure determination, as the 230 space groups are subdivided into these six categories, each containing subgroups derived from the holohedral parent via index relations. This approach is particularly useful in X-ray crystallography and materials science for predicting possible symmetries without initial metric constraints. Unlike crystal systems, which separate categories based on distinct unit cell metrics (such as rhombohedral versus hexagonal), families prioritize holohedral equivalence, ignoring such geometric distinctions to focus on symmetry hierarchies.Comparisons
Lattice systems, crystal systems, and crystal families represent hierarchical classifications in crystallography, each emphasizing different aspects of symmetry and geometry in three-dimensional space. Lattice systems focus primarily on the metric properties and Bravais lattice types, numbering seven: triclinic, monoclinic, orthorhombic, tetragonal, rhombohedral, hexagonal, and cubic. Crystal systems, also seven in number, incorporate point group symmetries alongside metrics, aligning closely with lattice systems except for the separation of rhombohedral (associated with trigonal symmetry) from hexagonal. Crystal families, reduced to six, group compatible systems and lattices based on shared holohedral point groups (Laue groups) and the number of independent lattice parameters, notably merging the trigonal and hexagonal crystal systems into a single hexagonal family.[20][3] The following table summarizes key attributes across these classifications, highlighting the number of Bravais lattices, point groups, and metric constraints for representative examples. Note that point group counts for crystal systems and families reflect the distinct symmetries within each; the hexagonal family combines 5 trigonal and 7 hexagonal point groups for a total of 12.[21][20]| Classification | Name | # Bravais Lattices | # Point Groups | Metric Constraints |
|---|---|---|---|---|
| Lattice System | Triclinic | 1 (primitive) | N/A | a ≠ b ≠ c; α ≠ β ≠ γ ≠ 90° |
| Crystal System | Triclinic | 1 (primitive) | 2 | a ≠ b ≠ c; α ≠ β ≠ γ ≠ 90° |
| Crystal Family | Triclinic | 1 (primitive) | 2 | a ≠ b ≠ c; α ≠ β ≠ γ ≠ 90° |
| Lattice System | Monoclinic | 2 (primitive, base-centered) | N/A | a ≠ b ≠ c; α = γ = 90°; β ≠ 90° |
| Crystal System | Monoclinic | 2 (primitive, base-centered) | 3 | a ≠ b ≠ c; α = γ = 90°; β ≠ 90° |
| Crystal Family | Monoclinic | 2 (primitive, base-centered) | 3 | a ≠ b ≠ c; α = γ = 90°; β ≠ 90° |
| Lattice System | Orthorhombic | 4 (primitive, base-, body-, face-centered) | N/A | a ≠ b ≠ c; α = β = γ = 90° |
| Crystal System | Orthorhombic | 4 (primitive, base-, body-, face-centered) | 3 | a ≠ b ≠ c; α = β = γ = 90° |
| Crystal Family | Orthorhombic | 4 (primitive, base-, body-, face-centered) | 3 | a ≠ b ≠ c; α = β = γ = 90° |
| Lattice System | Tetragonal | 2 (primitive, body-centered) | N/A | a = b ≠ c; α = β = γ = 90° |
| Crystal System | Tetragonal | 2 (primitive, body-centered) | 7 | a = b ≠ c; α = β = γ = 90° |
| Crystal Family | Tetragonal | 2 (primitive, body-centered) | 7 | a = b ≠ c; α = β = γ = 90° |
| Lattice System | Rhombohedral | 1 (primitive) | N/A | a = b = c; α = β = γ ≠ 90° |
| Crystal System | Trigonal | 1 (primitive rhombohedral) | 5 | a = b = c; α = β = γ ≠ 90° (or hexagonal description) |
| Lattice System | Hexagonal | 1 (primitive) | N/A | a = b ≠ c; α = β = 90°; γ = 120° |
| Crystal System | Hexagonal | 1 (primitive) | 7 | a = b ≠ c; α = β = 90°; γ = 120° |
| Crystal Family | Hexagonal | 2 (rhombohedral primitive, hexagonal primitive) | 12 | 2 parameters: either a = b ≠ c, α = β = 90°, γ = 120° or a = b = c, α = β = γ ≠ 90° |
| Lattice System | Cubic | 3 (primitive, body-, face-centered) | N/A | a = b = c; α = β = γ = 90° |
| Crystal System | Cubic | 3 (primitive, body-, face-centered) | 5 | a = b = c; α = β = γ = 90° |
| Crystal Family | Cubic | 3 (primitive, body-, face-centered) | 5 | a = b = c; α = β = γ = 90° |
Point groups and crystal classes
Overview of point groups
Point groups in crystallography are finite sets of symmetry operations—such as rotations, reflections, and inversions—that leave at least one point fixed in space while being compatible with the translational periodicity of a crystal lattice.[8] These operations must preserve the lattice's invariance, restricting possible rotations to angles of 60°, 90°, 120°, 180°, and 360°, thereby excluding 5-fold (72°) and other incompatible rotations that would disrupt periodic repetition.[8] The point groups thus represent the possible external symmetries of crystals, forming the foundation for classifying crystal classes. There are exactly 32 crystallographic point groups in three dimensions, derived by enumerating all finite symmetry operations (rotations, reflections, inversions) compatible with three-dimensional translational periodicity, restricting rotation orders to 1, 2, 3, 4, and 6.[8] This derivation begins with the simplest groups, such as the trivial group C₁ (order 1, identity only) and Cᵢ (order 2, identity and inversion), and builds through cyclic (monaxial) groups like C₃ (order 3: identity, 120° and 240° rotations) to polyaxial groups, incorporating reflections and rotoinversions.[8] The process classifies proper rotation groups (11 in total) and extends them with improper operations, yielding multiplicities from order 2 up to 48 for the full octahedral group Oₕ in the cubic system, which includes 24 proper rotations and their inverses.[8] These point groups are denoted using two primary notations: the Hermann-Mauguin (international) symbols, which specify principal rotation axes and mirror planes (e.g., 4mm for a 4-fold axis with two perpendicular mirror planes, corresponding to C_{4v}), and the Schoenflies notation, which emphasizes the group's structure (e.g., C_{4v} for the same group, indicating a cyclic 4-fold rotation with vertical mirrors).[21] Key operations are often listed explicitly, such as for the tetrahedral group T (Hermann-Mauguin 23; Schoenflies T), which comprises the identity and eight 3-fold rotations along the body diagonals of a cube.[8] Stereo diagrams, typically stereographic projections, visually represent these operations by projecting symmetry elements onto a plane, aiding in the identification of axes and planes without specifying crystal system assignments.[22] The 32 point groups serve as the symmetry containers within the seven crystal systems, determining the possible forms of crystal faces and habits.[5]Assignment to crystal systems
The assignment of the 32 crystallographic point groups to the seven crystal systems is based on their compatibility with the lattice symmetry of each system, specifically by grouping point groups that are subgroups of the holohedral (highest symmetry) point group for that system.[5] The holohedral point groups define the crystal systems: \bar{1} for triclinic, 2/m for monoclinic, mmm for orthorhombic, 4/mmm for tetragonal, \bar{3}m for trigonal, 6/mmm for hexagonal, and m\bar{3}m for cubic.[23] This ensures that all point groups within a system share the same underlying metric constraints on the unit cell parameters, such as equal axes or right angles, while lower-symmetry groups exhibit reduced elements like fewer rotation axes or mirror planes.[5] The distribution results in no overlaps between systems, with the total summing to 32 point groups, reflecting the exhaustive enumeration of symmetries compatible with three-dimensional translational periodicity.[23] The following table summarizes the counts and Hermann-Mauguin notations for the point groups in each system:| Crystal System | Number of Point Groups | Point Groups |
|---|---|---|
| Triclinic | 2 | 1, \bar{1} |
| Monoclinic | 3 | 2, m, 2/m |
| Orthorhombic | 3 | 222, mm2, mmm |
| Tetragonal | 7 | 4, \bar{4}, 4/m, 422, 4mm, \bar{4}2m, 4/mmm |
| Trigonal | 5 | 3, \bar{3}, 32, 3m, \bar{3}m |
| Hexagonal | 7 | 6, \bar{6}, 6/m, 622, 6mm, \bar{6}m2, 6/mmm |
| Cubic | 5 | 23, m\bar{3}, 432, \bar{4}3m, m\bar{3}m |
Bravais lattices
Structure and types
A Bravais lattice is defined as an infinite array of discrete points in three-dimensional space, generated by integer combinations of three basis vectors, such that each point has an identical environment relative to its neighbors.[27] These lattices, first systematically classified by Auguste Bravais in 1850, are distinguished solely by the choice of their basis vectors \vec{a}, \vec{b}, and \vec{c}, which determine the geometric arrangement and symmetry.[28] The positions of lattice points are given by \vec{R} = n\vec{a} + m\vec{b} + p\vec{c}, where n, m, p are integers.[27] The angles between these vectors are defined through dot products: \vec{a} \cdot \vec{b} = ab \cos \gamma, \vec{a} \cdot \vec{c} = ac \cos \beta, and \vec{b} \cdot \vec{c} = bc \cos \alpha, where \alpha is the angle between \vec{b} and \vec{c}, \beta between \vec{a} and \vec{c}, and \gamma between \vec{a} and \vec{b}.[3] Bravais lattices are categorized by four types of centering, which describe the placement of additional lattice points beyond the eight corners of a parallelepiped unit cell:- Primitive (P): Lattice points are located only at the eight corners of the unit cell, with each corner point shared among eight cells, resulting in one lattice point per cell.[3]
- Base-centered (C): In addition to the corner points, there is a lattice point at the center of two opposite faces (typically the base), yielding two lattice points per cell.[3]
- Body-centered (I, from the German Innenzentriert): Besides the corners, a lattice point is placed at the center of the unit cell, resulting in two lattice points per cell.[3]
- Face-centered (F): Additional lattice points are at the centers of all six faces, in addition to the corners, giving four lattice points per cell.[3]
| Crystal System | Bravais Lattices |
|---|---|
| Triclinic | P (aP) |
| Monoclinic | P (mP), C (mC) |
| Orthorhombic | P (oP), C (oC), I (oI), F (oF) |
| Tetragonal | P (tP), I (tI) |
| Trigonal | R (hR) |
| Hexagonal | P (hP) |
| Cubic | P (cP), I (cI), F (cF) |
Relation to crystal systems
The 14 Bravais lattices are assigned to the seven crystal systems according to their compatibility with the geometric constraints and symmetry elements defining each system, ensuring that the lattice translations preserve the system's metric relations (edge lengths and angles) and point group operations. This assignment results in a total of 14 distinct lattices rather than the theoretical maximum of 28 (seven systems times four possible centering types: primitive, base-centered, body-centered, and face-centered), because many combinations are either redundant—equivalent to a primitive lattice under axis redefinition—or incompatible with the lower symmetry of certain systems, where additional lattice points would violate the unique metric or symmetry requirements.[30][31] Compatibility rules dictate that higher centering types demand greater symmetry to remain distinct and non-reducible to primitive forms. For instance, face-centered (F) lattices are restricted to orthorhombic and cubic systems, where the orthogonal axes and sufficient equality allow all face-centered points to contribute uniquely without collapsing into a simpler structure; in lower-symmetry systems like triclinic or monoclinic, such centering would be equivalent to a primitive lattice by choosing appropriate unit cell orientations. Similarly, body-centered (I) lattices appear only in systems with at least orthorhombic or higher symmetry, as the central point requires inversion or equivalent operations to maintain lattice integrity. These restrictions arise from the need for the lattice to be invariant under the crystal system's point group operations while adhering to Bravais's criterion that no additional lattice points can be introduced without altering the structure's periodicity.[31][3] The specific assignment of the 14 Bravais lattices to the crystal systems is as follows: the triclinic system accommodates only the primitive (P) lattice; the monoclinic system includes primitive (P) and base-centered (C) lattices; the orthorhombic system has primitive (P), base-centered (C), body-centered (I), and face-centered (F) lattices; the tetragonal system features primitive (P) and body-centered (I) lattices; the trigonal system (in its rhombohedral representation) has the rhombohedral (R) lattice, which is primitive in that setting; the hexagonal system includes only the primitive (P) lattice; and the cubic system encompasses primitive (P), body-centered (I), and face-centered (F) lattices. This distribution reflects how increasing symmetry in higher systems permits more centering options without redundancy.[30] The choice of centering within a given crystal system can significantly influence the material's structural properties and physical behaviors. For example, in the tetragonal system, the body-centered (I) lattice, as seen in indium, introduces additional lattice points that alter packing density and coordination environments compared to the primitive (P) tetragonal lattice in rutile (TiO₂), potentially leading to differences in electronic conductivity, optical anisotropy, or mechanical strength due to varied interatomic distances and symmetry-imposed interactions. Such variations underscore how lattice centering modulates the overall crystal structure while remaining compatible with the system's symmetry. The following table summarizes the Bravais lattices by crystal system, including centering types and representative crystal examples:| Crystal System | Lattice Type | Centering | Example Crystal |
|---|---|---|---|
| Triclinic | Primitive triclinic | P | CuSO₄·5H₂O |
| Monoclinic | Primitive monoclinic | P | Gypsum (CaSO₄·2H₂O) |
| Monoclinic | Base-centered monoclinic | C | Monoclinic sulfur |
| Orthorhombic | Primitive orthorhombic | P | Barite (BaSO₄) |
| Orthorhombic | Base-centered orthorhombic | C | MgSO₄·7H₂O |
| Orthorhombic | Body-centered orthorhombic | I | KNO₃ |
| Orthorhombic | Face-centered orthorhombic | F | α-Sulfur |
| Tetragonal | Primitive tetragonal | P | Rutile (TiO₂) |
| Tetragonal | Body-centered tetragonal | I | Indium |
| Trigonal | Rhombohedral | R | Calcite (CaCO₃) |
| Hexagonal | Primitive hexagonal | P | Magnesium |
| Cubic | Primitive cubic | P | Polonium |
| Cubic | Body-centered cubic | I | α-Fe (iron) |
| Cubic | Face-centered cubic | F | Copper |
Extensions to other dimensions
Two-dimensional lattices
In two dimensions, crystal lattices exhibit translational symmetry in a plane, analogous to the periodic arrangements in three-dimensional crystals but restricted to planar structures. These lattices form the foundation for understanding symmetry in low-dimensional materials, where the arrangement of points must look identical from any lattice site under translations. Unlike three-dimensional Bravais lattices, which number 14, two-dimensional space yields only five distinct Bravais lattice types due to the reduced degrees of freedom in defining unit cell parameters.[34][35] The five two-dimensional Bravais lattices are classified based on their primitive vectors and symmetry constraints, primarily involving the lattice parameters a, b (side lengths), and the angle α between them. The oblique lattice has no symmetry-imposed restrictions, with a ≠ b and α arbitrary (neither 90° nor 60°), representing the most general case with only translational symmetry.[36][34] The rectangular (primitive) lattice requires α = 90° and a ≠ b, incorporating twofold rotational symmetry perpendicular to the plane.[36][37] The centered rectangular lattice features an additional lattice point at the center of the unit cell, often with a = b and α ≠ 90° (rhombic form), enhancing symmetry through mirroring and rotations.[36][34] The square lattice imposes a = b and α = 90°, invariant under 90° rotations (fourfold symmetry).[36][37] Finally, the hexagonal lattice has a = b and α = 60° (or 120°), supporting sixfold rotational symmetry, the highest in two dimensions.[36][34]| Lattice Type | Side Lengths | Angle α | Key Symmetry Elements |
|---|---|---|---|
| Oblique | a ≠ b | Arbitrary | Translational only (p1 or p2) |
| Rectangular (primitive) | a ≠ b | 90° | Twofold rotation, mirrors (pmm) |
| Centered rectangular | a = b | ≠90° | Twofold rotation, mirrors (cmm) |
| Square | a = b | 90° | Fourfold rotation, mirrors (p4mm) |
| Hexagonal | a = b | 60° | Sixfold rotation, mirrors (p6mm) |