On generalized Ramsey numbers in the non-integral regime
Abstract
A (p,q)-coloring of a graph G is an edge-coloring of G such that every p-clique receives at least q colors. In 1975, Erdos and Shelah introduced the generalized Ramsey number f(n,p,q) which is the minimum number of colors needed in a (p,q)-coloring of Kn. In 1997, Erdos and Gy\'arf\'as showed that f(n,p,q) is at most a constant times np-2p2 - q + 1. Very recently the first author, Dudek, and English improved this bound by a factor of n-1p2 - q + 1 for all q p2 - 26p + 554, and they ask if this improvement could hold for a wider range of q. We answer this in the affirmative for the entire non-integral regime, that is, for all integers p, q with p-2 not divisible by p2 - q + 1. Furthermore, we provide a simultaneous three-way generalization as follows: where p-clique is replaced by any fixed graph F (with |V(F)|-2 not divisible by |E(F)| - q + 1); to list coloring; and to k-uniform hypergraphs. Our results are a new application of the Forbidden Submatching Method of the second and fourth authors.
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