Phase Transitions of Structured Codes of Graphs

Abstract

We consider the symmetric difference of two graphs on the same vertex set [n], which is the graph on [n] whose edge set consists of all edges that belong to exactly one of the two graphs. Let F be a class of graphs, and let MF(n) denote the maximum possible cardinality of a family G of graphs on [n] such that the symmetric difference of any two members in G belongs to F. These concepts are recently investigated by Alon, Gujgiczer, K\"orner, Milojevi\'c, and Simonyi, with the aim of providing a new graphic approach to coding theory. In particular, MF(n) denotes the maximum possible size of this code. Existing results show that as the graph class F changes, MF(n) can vary from n to 2(1+o(1))n2. We study several phase transition problems related to MF(n) in general settings and present a partial solution to a recent problem posed by Alon et. al.