A proof of Tomescu's graph coloring conjecture
Abstract
In 1971, Tomescu conjectured that every connected graph G on n vertices with chromatic number k≥4 has at most k!(k-1)n-k proper k-colorings. Recently, Knox and Mohar proved Tomescu's conjecture for k=4 and k=5. In this paper, we complete the proof of Tomescu's conjecture for all k 4, and show that equality occurs if and only if G is a k-clique with trees attached to each vertex.
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