2-Factors in Graphs

Abstract

An account of 2-factors in graphs and their history is presented. We give a direct graph-theoretic proof of the 2-Factor Theorem and a new variant of it, and also a new complete characterisation of the maximal graphs without 2-factors. This is based on the important works of Tibor Gallai on 1-factors and of Hans-Boris Belck on k-factors, both published in 1950 and independently containing the theory of alternating chains. We also present an easy proof that a (2k+1)-regular graph with at most 2k leaves has a 2-factor, and we describe all connected (2k+1)-regular graphs with exactly 2k+1 leaves without a 2-factor. This generalises Julius Petersen's famous theorem, that any 3-regular graph with at most two leaves has a 1-factor, and it generalises the extremal graphs Sylvester discovered for that theorem.

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