Affine isomorphism
From Online Dictionary of Crystallography
Revision as of 11:10, 12 May 2017 by BrianMcMahon (talk | contribs) (Style edits to align with printed edition)
Revision as of 11:10, 12 May 2017 by BrianMcMahon (talk | contribs) (Style edits to align with printed edition)
Each symmetry operation of a crystallographic group in E3 may be represented by a 3×3 matrix W (the linear part) and a vector w. Two crystallographic groups G1 = {(W1i,w1i)} and G2 = {(W2i,w2i)} are called affine isomorphic if there exists a non-singular 3×3 matrix A and a vector a such that:
G2 = {(A,a)(W1i,w1i)(A,a)-1}.
Two crystallographic groups are affine isomorphic if and only if their arrangement of symmetry elements may be mapped onto each other by an affine mapping of E3. Two affine isomorphic groups are always isomorphic.