Inducibility of the Net Graph

Abstract

A graph F is called a fractalizer if for all n the only graphs which maximize the number of induced copies of F on n vertices are the balanced iterated blow ups of F. While the net graph is not a fractalizer, we show that the net is nearly a fractalizer. Let N(n) be the maximum number of induced copies of the net graph among all graphs on n vertices. For sufficiently large n we show that, N(n) = x1· x2 · x3 · x4 · x5 · x6 + N(x1) + N(x2) + N(x3) + N(x4) + N(x5) + N(x6) where σ xi = n and all xi are as equal as possible. Furthermore, we show that the unique graph which maximizes N(6k) is the balanced iterated blow up of the net for k sufficiently large. We expand on the standard flag algebra and stability techniques through more careful counting and numerical optimization techniques.