The asymptotic behavior of the correspondence chromatic number

Abstract

Alon proved that for any graph G, (G) = ( d), where (G) is the list chromatic number of G and d is the average degree of G. Dvor\'ak and Postle recently introduced a generalization of list coloring, which they called correspondence coloring. We establish an analogue of Alon's result for correspondence coloring; namely, we show that c(G) = (d/ d), where c(G) denotes the correspondence chromatic number of G. We also prove that for triangle-free G, c(G) = O(/ ), where is the maximum degree of G (this is a generalization of Johansson's result about list colorings). This implies that the correspondence chromatic number of a regular triangle-free graph is, up to a constant factor, determined by its degree.