Almost-perfect colorful matchings in three-edge-colored bipartite graphs

Abstract

We prove that, for positive integers n,a1, a2, a3 satisfying a1+a2+a3 = n-1, it holds that any bipartite graph G which is the union of three perfect matchings M1, M2, and M3 on 2n vertices contains a matching M such that |M Mi| =ai for i= 1,2, and 3. The bound n-1 on the sum is best possible in general. Our result verifies the multiplicity extension of the Ryser-Brualdi-Stein Conjecture, proposed recently by Anastos, Fabian, M\"uyesser, and Szab\'o, for three colors.

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