Cycles of many lengths in digraphs with Meyniel-like condition
Abstract
C. Thomassen (Proc. London Math. Soc. (3) 42 (1981), 231-251) gave a characterization of strongly connected non-Hamiltonian digraphs of order p≥ 3 with minimum degree p-1. In this paper we give an analogous characterization of strongly connected non-Hamiltonian digraphs with Meyniel-type condition (the sum of degrees of every pair of non-adjacent vertices x and y at least 2p-2). Moreover, we prove that such digraphs D contain cycles of all lengths k, for 2≤ k≤ m, where m is the length of a longest cycle in D.
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