The List Linear Arboricity of Digraphs
Abstract
A (directed) linear forest is a (di)graph whose components are (directed) paths. The linear arboricity la(F) of a (di)graph F is the minimum number of (directed) linear forests required to decompose its edges. Akiyama, Exoo, and Harary (1980) proposed the Linear Arboricity Conjecture that la(G) ≤ +12 for any graph G of maximum degree . The current best known bound, due to Lang and Postle (2023), establishes la(G) ≤ 2 + 3 4 for sufficiently large . And they proved this in the stronger list setting proposed by An and Wu. For a digraph D, let its maximum degree (D) be the maximum of all in-degrees and out-degrees of its vertices. Nakayama and P\'eroche (1987) conjectured that la(D) ≤ (D)+1 for every digraph D. We extend Lang and Postle's result to digraphs with a matching error term. We show that la(D) ≤ + 6 4 for any digraph D with = (D) sufficiently large. Moreover, we also establish this bound in the stronger list setting, where each arc e ∈ A(D) is assigned a list of colors, and each arc is assigned a color from its list such that each color class forms a directed linear forest.
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