An Ore-type Condition for Large k-factor and Disjoint Perfect Matchings

Abstract

Win [J. Graph Theory 6(1982), 489--492] conjectured that a graph G on n vertices contains k disjoint perfect matchings, if the degree sum of any two nonadjacent vertices is at least n+k-2, where n is even and n≥ k+2. In this paper, we prove that Win's conjecture is true for k≥ n/2, where n is sufficiently large. To show this result, we prove a theorem on k-factor in a graph under some Ore-type condition. Our main tools include Tutte's k-factor theorem, the Karush-Kuhn-Tucker theorem on convex optimization, and the solution to the longstanding 1-factor decomposition conjecture.