On subgraphs with degrees of prescribed residues in the random graph

Abstract

We show that with high probability the random graph Gn, 1/2 has an induced subgraph of linear size, all of whose degrees are congruent to r q for any fixed r and q≥ 2. More generally, the same is true for any fixed distribution of degrees modulo q. Finally, we show that with high probability we can partition the vertices of Gn, 1/2 into q+1 parts of nearly equal size, each of which induces a subgraph all of whose degrees are congruent to r q. Our results resolve affirmatively a conjecture of Scott, who addressed the case q=2.