Coloring of graphs without long odd holes
Abstract
A hole is an induced cycle of length at least 4, a k-hole is a hole of length k, and an odd hole is a hole of odd length. Let 2 be an integer. Let A be the family of graphs of girth at least 2 and having no odd holes of length at least 2+3, let B be the triangle-free graphs which have no 5-holes and no odd holes of length at least 2+3, and let G be the family of graphs of girth 2+1 and have no odd hole of length at least 2+5. Chudnovsky et al. CSS2016 proved that every graph in A2 is 58000-colorable, and every graph in B is (+1)4-1-colorable. Lan and liu LL2023 showed that for ≥3, every graph in G is 4-colorable. It is not known whether there exists a small constant c such that graphs of G2 are c-colorable. In this paper, we show that every graph in G2 is 1456-colorable, and every graph in A3 is 4-colorable. We also show that every 7-hole free graph in B is (12+8)-colorable.
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