%0 Journal Article
%T Multiplicity-weighted Euler's formula for symmetrically arranged space-filling polyhedra.
%A Dauter Z
%A Jaskolski M
%J Acta Crystallogr A Found Adv
%V 76
%N 0
%D Sep 2020 1
%M 32869755
%F 2.331
%R 10.1107/S2053273320007093
%X The famous Euler's rule for three-dimensional polyhedra, F - E + V = 2 (F, E and V are the numbers of faces, edges and vertices, respectively), when extended to many tested cases of space-filling polyhedra such as the asymmetric unit (ASU), takes the form Fn - En + Vn = 1, where Fn, En and Vn enumerate the corresponding elements, normalized by their multiplicity, i.e. by the number of times they are repeated by the space-group symmetry. This modified formula holds for the ASUs of all 230 space groups and 17 two-dimensional planar groups as specified in the International Tables for Crystallography, and for a number of tested Dirichlet domains, suggesting that it may have a general character. The modification of the formula stems from the fact that in a symmetrical space-filling arrangement the polyhedra (such as the ASU) have incomplete bounding elements (faces, edges, vertices), since they are shared (in various degrees) with the space-filling neighbors.