Flips in Graphs

Abstract

We study a problem motivated by a question related to quantum-error-correcting codes. Combinatorially, it involves the following graph parameter: f(G)=|A|+|\x∈ V A : dA(x)is odd\| : A≠, where V is the vertex set of G and dA(x) is the number of neighbors of x in A. We give asymptotically tight estimates of f for the random graph Gn,p when p is constant. Also, if f(n)=f(G): |V(G)|=n then we show that f(n)≤ (0.382+o(1))n.