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The Number of Independent Sets in a Regular Graph

Published 2009-09-18Version 1

We show that the number of independent sets in an N-vertex, d-regular graph is at most (2^{d+1} - 1)^{N/2d}, where the bound is sharp for a disjoint union of complete d-regular bipartite graphs. This settles a conjecture of Alon in 1991 and Kahn in 2001. Kahn proved the bound when the graph is assumed to be bipartite. We give a short proof that reduces the general case to the bipartite case. Our method also works for a weighted generalization, i.e., an upper bound for the independence polynomial of a regular graph.

Comments: 5 pages. Accepted by Combin. Probab. Comput

Journal: Combinatorics, Probability and Computing, 19 (2010), No. 2, 315-320

DOI: 10.1017/S0963548309990538

Categories: math.CO

Subjects: 05C69

Keywords: independent sets, complete d-regular bipartite graphs, bipartite case, disjoint union, general case

Tags: journal article

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