Colouring powers of cycles from random lists

Abstract

Let Cnk be the k-th power of a cycle on n vertices (i.e. the vertices of Cnk are those of the n-cycle, and two vertices are connected by an edge if their distance along the cycle is at most k). For each vertex draw uniformly at random a subset of size c from a base set S of size s=s(n). In this paper we solve the problem of determining the asymptotic probability of the existence of a proper colouring from the lists for all fixed values of c,k, and growing n.

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