The $Ï$-Capacity of a Graph
arXiv:1607.07263 · doi:10.1109/TIT.2017.2669196
Abstract
Motivated by the problem of zero-error broadcasting, we introduce a new notion of graph capacity, termed $Ï$-capacity, that generalizes the Shannon capacity of a graph. We derive upper and lower bounds on the $Ï$-capacity of arbitrary graphs, and provide a Lovász-type upper bound for regular graphs. We study the behavior of the $Ï$-capacity under two graph operations: the strong product and the disjoint union. Finally, we investigate the connection between the structure of a graph and its $Ï$-capacity.
21 pages