Coloring Chains for Compression with Uncertain Priors

Abstract

Haramaty and Sudan considered the problem of transmitting a message between two people, Alice and Bob, when Alice's and Bob's priors on the message are allowed to differ by at most a given factor. To find a deterministic compression scheme for this problem, they showed that it is sufficient to obtain an upper bound on the chromatic number of a graph, denoted U(N,s,k) for parameters N,s,k, whose vertices are nested sequences of subsets and whose edges are between vertices that have similar sequences of sets. In turn, there is a close relationship between the problem of determining the chromatic number of U(N,s,k) and a local graph coloring problem considered by Erdos et al. We generalize the results of Erdos et al. by finding bounds on the chromatic numbers of graphs H and G when there is a homomorphism φ :H→ G that satisfies a nice property. We then use these results to improve upper and lower bounds on (U(N,s,k)).