Privileged users in zero-error transmission over a noisy channel
Abstract
The k-th power of a graph G is the graph whose vertex set is V(G)k, where two distinct k-tuples are adjacent iff they are equal or adjacent in G in each coordinate. The Shannon capacity of G, c(G), is k∞α(Gk)1/k, where α(G) denotes the independence number of G. When G is the characteristic graph of a channel C, c(G) measures the effective alphabet size of C in a zero-error protocol. A sum of channels, C=Σi Ci, describes a setting when there are t≥ 2 senders, each with his own channel Ci, and each letter in a word can be selected from either of the channels. This corresponds to a disjoint union of the characteristic graphs, G=Σi Gi. We show that for any fixed t and any family F of subsets of T=1,2,...,t, there are t graphs G1,G2, ...,Gt, so that for every subset I of T, the Shannon capacity of the disjoint union Σi ∈ I Gi is "large" if I contains a member of F, and is "small" otherwise.
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