On strong odd colorings of graphs
Abstract
A strong odd coloring of a simple graph G is a proper coloring of the vertices of G such that for every vertex v and every color c, either c is used an odd number of times in the open neighborhood NG(v) or no neighbor of v is colored by c. The smallest integer k for which G admits a strong odd coloring with k colors is the strong odd chromatic number, soc(G). These coloring notion and graph parameter were recently defined in [H. Kwon and B. Park, Strong odd coloring of sparse graphs, ArXiv:2401.11653v2]. We answer a question raised by the originators concerning the existence of a constant bound for the strong odd chromatic number of all planar graphs. We also consider strong odd colorings of trees, unicyclic graphs and graph products.
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