A zeta function approach to the relation between the numbers of symmetry planes and axes of a polytope

Abstract

A derivation of the Ces\`aro-Fedorov relation from the Selberg trace formula on an orbifolded 2-sphere is elaborated and extended to higher dimensions using the known heat-kernel coefficients for manifolds with piecewise-linear boundaries. Several results are obtained that relate the coefficients, bi, in the Shephard-Todd polynomial to the geometry of the fundamental domain. For the 3-sphere we show that b4 is given by the ratio of the volume of the fundamental tetrahedron to its Schl\"afli reciprocal.

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