On edge connectivity and parity factor

Title: On edge connectivity and parity factor
Creator: Lu, Hong Liang; Wang, Wei; Lin, Yuqing
Relation: Acta Mathematica Sinica Vol. 31, Issue 5, p. 772-776
Publisher Link: http://dx.doi.org/10.1007/s10114-015-4104-0
Publisher: Springer
Resource Type: journal article
Date: 2015
Description: By Petersen’s Theorem, a bridgeless cubic graph has a 2-factor. Fleischner (Discrete Math., 101, 33–37 (1992)) has extended this result to bridgeless graphs of minimum degree at least three by showing that every such graph has an even factor without isolated vertices. Let me_e > 0 be even and m_o > 0 be odd. In this paper, we prove that every m_e-edge-connected graph with minimum degree at least m_e + 1 contains an even factor with minimum degree at least m_e and every (m_o + 1)-edge-connected graph contains an odd factor with minimum degree at least m_o, which further extends Fleischner’s result. Moreover, we show that our results are best possible.
Subject: edge connectivity; parity factor
Identifier: http://hdl.handle.net/1959.13/1315615
Identifier: uon:22972
Identifier: ISSN:1439-8516
Language: eng
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