Enumerating and identifying semiperfect colorings of symmetrical patterns

Abstract

If G is the symmetry group of an uncolored pattern then a coloring of the pattern is semiperfect if the associated color group H is a subgroup of G of index 2. We give results on how to identify and enumerate all inequivalent semiperfect colorings of certain patterns. This is achieved by treating a coloring as a partition \hJiYi:i∈ I,h∈ H\ of G, where H is a subgroup of index 2 in G, Ji≤ H for i∈ I, and Y=i∈ IYi is a complete set of right coset representatives of H in G. We also give a one-to-one correspondence between inequivalent semiperfect colorings whose associated color groups are conjugate subgroups with respect to the normalizer of G in the group of isometries of Rn.