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Angle sums of simplicial polytopes

Published 14 Jul 2020 in math.CO and math.MG | (2007.07050v1)

Abstract: The interior angle vector ($\widehat{\alpha}$-vector) of a polytope is a metric analogue of the $f$-vector in which faces are weighted by their solid angle. For simplicial polytopes, Dehn-Sommerville-type relations on the $\widehat{\alpha}$-vector were introduced by Sommerville (1927) and H\"ohn (1953). Camenga (2006) defined the $\widehat{\gamma}$-vector, a linear transformation analogous to the $h$-vector and conjectured it to be non-negative. Using tools from geometric and algebraic combinatorics, we prove this conjecture and show that the $\widehat{\gamma}$-vector increases in the first half and is flawless. In contrast to the $h$-vector, we construct a six-dimensional polytope with non-unimodal $\widehat{\gamma}$-vector. More generally, all result remain valid when solid angles are replaced by simple and non-negative cone valuations.

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