Proof of the Kalai-Meshulam conjecture
Abstract
Let G be a graph, and let fG be the sum of (-1)|A|, over all stable sets A. If G is a cycle with length divisible by three, then fG= 2. Motivated by topological considerations, G. Kalai and R. Meshulam made the conjecture that,if no induced cycle of a graph G has length divisible by three, then |fG| 1. We prove this conjecture.
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