DSpace at EWHA: A Cheeger inequality of a distance regular graph using Green's function (vol 313, pg 2337, 2013)

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DC Field	Value	Language
dc.contributor.author	이윤진	*
dc.date.accessioned	2016-08-27T04:08:30Z	-
dc.date.available	2016-08-27T04:08:30Z	-
dc.date.issued	2015	*
dc.identifier.issn	0012-365X	*
dc.identifier.issn	1872-681X	*
dc.identifier.other	OAK-14912	*
dc.identifier.uri	https://dspace.ewha.ac.kr/handle/2015.oak/217210	-
dc.description.abstract	In the published version, we obtain a cheeger inequality of distance regular graphs in terms of the smallest positive eigenvalue of the Laplacian and a value alpha(d). However, we confirm that we need an additional condition for our Cheeger inequality of distance regular graphs: if tvr(i)((t)) > lambda(1)/1+lambda(1) for t <= alpha(d), then we obtain a Cheeger inequality of distance regular graphs as h(Gamma) < alpha(d)/lambda(1). (C) 2015 Elsevier B.V. All rights reserved.	*
dc.language	English	*
dc.publisher	ELSEVIER SCIENCE BV	*
dc.subject	Green's function	*
dc.subject	Laplacian	*
dc.subject	P-polynomial scheme	*
dc.subject	Distance regular graph	*
dc.subject	Cheeger constant	*
dc.subject	Cheeger inequality	*
dc.title	A Cheeger inequality of a distance regular graph using Green's function (vol 313, pg 2337, 2013)	*
dc.type	Correction	*
dc.relation.issue	9	*
dc.relation.volume	338	*
dc.relation.index	SCI	*
dc.relation.index	SCIE	*
dc.relation.index	SCOPUS	*
dc.relation.startpage	1621	*
dc.relation.lastpage	1623	*
dc.relation.journaltitle	DISCRETE MATHEMATICS	*
dc.identifier.doi	10.1016/j.disc.2015.04.010	*
dc.identifier.wosid	WOS:000356126700011	*
dc.identifier.scopusid	2-s2.0-84928794311	*
dc.author.google	Kim, Gil Chun	*
dc.author.google	Lee, Yoonjin	*
dc.contributor.scopusid	이윤진(23100337700)	*
dc.date.modifydate	20240123113558	*