On a conjecture that strengthens Kundu's k-factor Theorem

Abstract

Let π=(d1,…,dn) be a non-increasing degree sequence with even n. In 1974, Kundu showed that if Dk(π)=(d1-k,…,dn-k) is graphic, then some realization of π has a k-factor. For r≤ 2, Busch et al. and later Seacrest for r≤ 4 showed that if r≤ k and Dk(π) is graphic, then there is a realization with a k-factor whose edges can be partitioned into a (k-r)-factor and r edge-disjoint 1-factors. We improve this to any r≤ \k+53,k\. In 1978, Brualdi and then Busch et al. in 2012, conjectured that r=k. The conjecture is still open for k≥6. However, Busch et al. showed the conjecture is true when d1≤ n2+1 or dn≥ n2+k-2. We explore this conjecture by first developing new tools that generalize edge-exchanges. With these new tools, we can drop the assumption Dk(π) is graphic and show that if dd1-dn+k≥ d1-dn+k-1, then π has a realization with k edge-disjoint 1-factors. From this we confirm the conjecture when dn≥ d1+k-12 or when Dk(π) is graphic and d1≤ \n/2+dn-k,(n+dn)/2\.

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