A note on one-sided interval edge colorings of bipartite graphs

Abstract

For a bipartite graph G with parts X and Y, an X-interval coloring is a proper edge coloring of G by integers such that the colors on the edges incident to any vertex in X form an interval. Denote by 'int(G,X) the minimum k such that G has an X-interval coloring with k colors. The author and Toft conjectured [Discrete Mathematics 339 (2016), 2628--2639] that there is a polynomial P(x) such that if G has maximum degree at most , then 'int(G,X) ≤ P(). In this short note, we prove this conjecture; in fact, we prove that a cubic polynomial suffices. We also deduce some improved upper bounds on 'int(G,X) for bipartite graphs with small maximum degree.

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