On superconnectivity of (4, g)-cages

Title: On superconnectivity of (4, g)-cages
Creator: Lu, Hongliang; Wu, Yunjian; Lin, Yuqing; Yu, Qinglin; Balbuena, Camino; Marcote, Xavier
Relation: Graphs and Combinatorics Vol. 29, Issue 1, p. 105-119
Publisher Link: http://dx.doi.org/10.1007/s00373-011-1091-5
Publisher: Springer Japan
Resource Type: journal article
Date: 2013
Description: A (k, g)-cage is a graph that has the least number of vertices among all k-regular graphs with girth g. It has been conjectured (Fu et al. in J. Graph Theory, 24:187-191, 1997) that all (k, g)-cages are k-connected for every k = 3. A k-connected graph G is called superconnected if every k-cutset S is the neighborhood of some vertex. Moreover, if G-S has precisely two components, then G is called tightly superconnected. In this paper, we prove that every (4, g)-cage is tightly superconnected when g = 11 is odd.
Subject: cage; superconnected; tightly superconnected
Identifier: http://hdl.handle.net/1959.13/1063484
Identifier: uon:17310
Identifier: ISSN:0911-0119
Language: eng
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