Combinatorics of the Cosmohedron
Abstract
The cosmohedron was recently proposed as a polytope underlying the cosmological wavefunction for Tr(3) theory. Its faces were conjectured to be in bijection with Matryoshkas, which are obtained from a subdivision of a polygon by sequentially wrapping groups of polygons into larger polygons. In this paper we prove the correctness of this construction, and elucidate its combinatorial structure. Cosmohedra generalize to a wider class of X in Y polytopes, where we chisel a polytope from the family X at each vertex of a polytope Y. We sketch a new application of these chiseled polytopes to the physics of ultraviolet divergences in loop-integrated Feynman amplitudes.
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