Navigating Between Packings of Graphic Sequences

Abstract

Let π1=(d1(1), …,dn(1)) and π2=(d1(2),…,dn(2)) be graphic sequences. We say they pack if there exist edge-disjoint realizations G1 and G2 of π1 and π2, respectively, on vertex set \v1,…,vn\ such that for j∈\1,2\, dGj(vi)=di(j) for all i∈\1,…,n\. In this case, we say that (G1,G2) is a (π1,π2)-packing. A clear necessary condition for graphic sequences π1 and π2 to pack is that π1+π2, their componentwise sum, is also graphic. It is known, however, that this condition is not sufficient, and furthermore that the general problem of determining if two sequences pack is NP- complete. S.~Kundu proved in 1973 that if π2 is almost regular, that is each element is from \k-1, k\, then π1 and π2 pack if and only if π1+π2 is graphic. In this paper we will consider graphic sequences π with the property that π+1 is graphic. By Kundu's theorem, the sequences π and 1 pack, and there exist edge-disjoint realizations G and I, where I is a 1-factor. We call such a (π,1) packing a Kundu realization. Assume that π is a graphic sequence, in which each term is at most n/24, that packs with 1. This paper contains two results. On one hand, any two Kundu realizations of the degree sequence π+1 can be transformed into each other through a sequence of other Kundu realizations by swap operations. On the other hand, the same conditions ensure that any particular 1-factor can be part of a Kundu realization of π+1.