The Elser nuclei sum revisited
Abstract
Fix a finite undirected graph and a vertex v of . Let E be the set of edges of . We call a subset F of E pandemic if each edge of has at least one endpoint that can be connected to v by an F-path (i.e., a path using edges from F only). In 1984, Elser showed that the sum of (-1)| F| over all pandemic subsets F of E is 0 if E≠ . We give a simple proof of this result via a sign-reversing involution, and discuss variants, generalizations and refinements, revealing connections to abstract convexity (the notion of an antimatroid) and discrete Morse theory.
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