On the normalized Shannon capacity of a union

Abstract

Let G1 × G2 denote the strong product of graphs G1 and G2, i.e. the graph on V(G1) × V(G2) in which (u1,u2) and (v1,v2) are adjacent if for each i=1,2 we have ui=vi or uivi ∈ E(Gi). The Shannon capacity of G is c(G) = n ∞ α (Gn)1/n, where Gn denotes the n-fold strong power of G, and α (H) denotes the independence number of a graph H. The normalized Shannon capacity of G is C(G) = c(G) |V(G)|. Alon asked whether for every ε > 0 there are graphs G and G' satisfying C(G), C(G') < ε but with C(G + G') > 1 - ε . We show that the answer is no.