Let G be a balanced bipartite graph of order 2n >= 4, and let sigma(1,1)(G) be the minimum degree sum of two non-adjacent vertices in different partite sets of G. In 1963, Moon and Moser proved that if sigma(1,1)(G) >= n + 1, then G is hamiltonian. In this note, we show that if k is a positive integer, then the Moon Moser condition also implies the existence of a 2-factor with exactly k cycles for sufficiently large graphs. In order to prove this, we also give a sigma(1,1) condition for the existence of k vertex-disjoint alternating cycles with respect to a chosen perfect matching in G.

• 出版日期2017-12