Approximating the circumference of 3-connected claw-free graphs

Approximating the circumference of 3-connected claw-free graphs

Jackson and Wormald show that every 3-connected K_1,d-free graph, on n vertices, contains a cycle of length at least 1/2 n^g(d) where g(d) = (log_2 6 + 2 log_2 (2d+1))^-1. For d = 3, g(d) ~ 0.122. Improving this bound, we prove that if G is a 3-connected claw-free graph on at least 6 vertices, then...

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Bibliographic Details
Main Author:	Bilinski, Mark
Published:	Georgia Institute of Technology 2009
Subjects:	Claw-free 3-connected Long cycles Graph theory Decomposition (Mathematics)
Online Access:	http://hdl.handle.net/1853/26516

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