On the extremal number of edges in hamiltonian connected graphs

doi:10.1016/j.aml.2009.03.025

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DC 欄位	值	語言
dc.contributor.author	Ho, Tung-Yang	en_US
dc.contributor.author	Lin, Cheng-Kuan	en_US
dc.contributor.author	Tan, Jimmy J. M.	en_US
dc.contributor.author	Hsu, D. Frank	en_US
dc.contributor.author	Hsu, Lih-Hsing	en_US
dc.date.accessioned	2014-12-08T15:08:02Z	-
dc.date.available	2014-12-08T15:08:02Z	-
dc.date.issued	2010-01-01	en_US
dc.identifier.issn	0893-9659	en_US
dc.identifier.uri	http://dx.doi.org/10.1016/j.aml.2009.03.025	en_US
dc.identifier.uri	http://hdl.handle.net/11536/6291	-
dc.description.abstract	Assume that n and delta are positive integers with 3 <= delta < n. Let hc(n, delta) be the minimum number of edges required to guarantee an n-vertex graph G with minimum degree delta(G) >= delta to be haimiltonian connected. Any n-vertex graph G with delta(G) >= delta is hamiltonian connected if vertical bar E(G)vertical bar >= hc(n, delta). We prove that hc(n, delta) = C(n - delta + 1, 2) + delta(2) - delta + 1 if delta <= [n+3x(n mod 2)/6] + 1, hc(n, delta) = C(n - [n/2] + 1, 2) + [n/w](2) - [n/2] + 1 if [n+3x(n mod 2)/6] + 1 < delta <= [n/2], and hc(n, delta) = [n delta/2] if delta > [n/2]. (C) 2009 Elsevier Ltd. All rights reserved.	en_US
dc.language.iso	en_US	en_US
dc.subject	Hamiltonian connected	en_US
dc.subject	Edge-fault tolerant hamiltonian connected	en_US
dc.title	On the extremal number of edges in hamiltonian connected graphs	en_US
dc.type	Article	en_US
dc.identifier.doi	10.1016/j.aml.2009.03.025	en_US
dc.identifier.journal	APPLIED MATHEMATICS LETTERS	en_US
dc.citation.volume	23	en_US
dc.citation.issue	1	en_US
dc.citation.spage	26	en_US
dc.citation.epage	29	en_US
dc.contributor.department	資訊工程學系	zh_TW
dc.contributor.department	Department of Computer Science	en_US
dc.identifier.wosnumber	WOS:000272642100006	-
dc.citation.woscount	0	-
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