Linear arboricity of degenerate graphs

Abstract

A linear forest is a union of vertex-disjoint paths, and the linear arboricity of a graph G, denoted by la(G), is the minimum number of linear forests needed to partition the edge set of G. Clearly, la(G) (G)/2 for a graph G with maximum degree (G). On the other hand, the Linear Arboricity Conjecture due to Akiyama, Exoo, and Harary from 1981 asserts that la(G) ≤ ((G)+1) / 2 for every graph G . This conjecture has been verified for planar graphs and graphs whose maximum degree is at most 6 , or is equal to 8 or 10 . Given a positive integer k, a graph G is k-degenerate if it can be reduced to a trivial graph by successive removal of vertices with degree at most k. We prove that for any k-degenerate graph G, la(G) = (G)/2 provided (G) 2k2 -k.

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