Abstract
We investigate a number of coloring problems restricted to bipartite graphs with bounded diameter. First, we investigate the $k$-List Coloring, $k$-Coloring, and $k$-Precoloring Extension problems on bipartite graphs with diameter at most $d$, proving $\textsf{NP}$-completeness in most cases, and leaving open only the List $3$-Coloring and $3$-Precoloring Extension problems when $d=3$.
 Some of these results are obtained $\textsc{through}$ a proof that the Surjective $C_6$-Homomorphism problem is $\textsf{NP}$-complete on bipartite graphs with diameter at most four. Although the latter result has been already proved [Vikas, 2017], we present ours as an alternative simpler one. As a byproduct, we also get that $3$-Biclique Partition is $\textsf{NP}$-complete. An attempt to prove this result was presented in [Fleischner, Mujuni, Paulusma, and Szeider, 2009], but there was a flaw in their proof, which we identify and discuss here.
 Finally, we prove that the $3$-Fall Coloring problem is $\textsf{NP}$-complete on bipartite graphs with diameter at most four, and prove that $\textsf{NP}$-completeness for diameter three would also imply $\textsf{NP}$-completeness of $3$-Precoloring Extension on diameter three, thus closing the previously mentioned open cases. This would also answer a question posed in [Kratochvíl, Tuza, and Voigt, 2002].
Highlights
Graph coloring problems are among the most fundamental and studied problems in graph theory, due to their practical and theoretical importance
A proper coloring of a graph G is a function f : V (G) → N such that f (u) = f (v) for every edge uv ∈ E(G), and the k-Coloring problem asks whether a given graph G admits a proper coloring using at most k colors
We study two of the most general coloring problems: list coloring and graph homomorphism
Summary
Graph coloring problems are among the most fundamental and studied problems in graph theory, due to their practical and theoretical importance. This leaves as the only open cases the complexity of 3-PreExt and related problems, when restricted to bipartite graphs with diameter three It is well-known that a k-coloring can be seen as a homomorphism to Kk (the complete graph on k vertices). Letting H ∼= C6 and G = (X ∪ Y, E) be bipartite, we show that Retract to C6 is NP-complete even if V (H) ∩ Y dominates X, and each y ∈ V (H) ∩ Y is at distance at most 2 from y , for every y ∈ Y We use this result to show that 3-PreExt, Edge-Surjective C6-Homomorphism, and Surjective C6-Homomorphism are NP-complete even when restricted to bipartite graphs with diameter four.
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