Realizing degree sequences as Z3-connected graphs

Abstract

An integer-valued sequence π=(d1, …, dn) is graphic if there is a simple graph G with degree sequence of π. We say the π has a realization G. Let Z3 be a cyclic group of order three. A graph G is Z3-connected if for every mapping b:V(G) Z3 such that Σv∈ V(G)b(v)=0, there is an orientation of G and a mapping f: E(G) Z3-\0\ such that for each vertex v∈ V(G), the sum of the values of f on all the edges leaving from v minus the sum of the values of f on the all edges coming to v is equal to b(v). If an integer-valued sequence π has a realization G which is Z3-connected, then π has a Z3-connected realization G. Let π=(d1, …, dn) be a graphic sequence with d1 … dn 3. We prove in this paper that if d1 n-3, then either π has a Z3-connected realization unless the sequence is (n-3, 3n-1) or is (k, 3k) or (k2, 3k-1) where k=n-1 and n is even; if dn-5 4, then either π has a Z3-connected realization unless the sequence is (52, 34) or (5, 35).