Some criteria for integer sequences pair being realizable by a graph

Abstract

Let A=(a1,…,an) and B=(b1,…,bn) be two sequences of nonnegative integers with ai bi for 1 i n. The pair (A;B) is said to be realizable by a graph if there exists a simple graph G with vertices v1,…, vn such that ai dG(vi) bi for 1 i n. Let denote the lexicographic ordering on Z× Z: (ai+1,bi+1) (ai,bi) [(ai+1<ai) ((ai+1=ai)\&(bi+1 bi))]. We say that the sequences A and B are in good order if (ai+1,bi+1) (ai,bi). In this paper, we consider the generalizations of six classical characterizations on sequences pair due to Berge, Ryser et al. and present related results.