Small Maximal Independent Sets and Faster Exact Graph Coloring

Abstract

We show that, for any n-vertex graph G and integer parameter k, there are at most 34k-n4n-3k maximal independent sets I ⊂ G with |I| <= k, and that all such sets can be listed in time O(34k-n 4n-3k). These bounds are tight when n/4 <= k <= n/3. As a consequence, we show how to compute the exact chromatic number of a graph in time O((4/3 + 34/3/4)n) ~= 2.4150n, improving a previous O((1+31/3)n) ~= 2.4422n algorithm of Lawler (1976).

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