DSpace at EWHA: BIASES IN INTEGER PARTITIONS

View : 666 Download: 0

Full metadata record

DC Field	Value	Language
dc.contributor.author	김은미	*
dc.date.accessioned	2021-11-16T16:31:48Z	-
dc.date.available	2021-11-16T16:31:48Z	-
dc.date.issued	2021	*
dc.identifier.issn	0004-9727	*
dc.identifier.issn	1755-1633	*
dc.identifier.other	OAK-30148	*
dc.identifier.uri	https://dspace.ewha.ac.kr/handle/2015.oak/259529	-
dc.description.abstract	We show that there are biases in the number of appearances of the parts in two residue classes in the set of ordinary partitions. More precisely, let p(j,k,m)(n) be the number of partitions of n such that there are more parts congruent to j modulo m than parts congruent to k modulo m for m >= 2. We prove that p(1,0,m)(n) is in general larger than p(0,)(1,m)(n). We also obtain asymptotic formulas for p(1,0,m)(n) and p(0,)(1,m)(n) for m >= 2.	*
dc.language	English	*
dc.publisher	CAMBRIDGE UNIV PRESS	*
dc.subject	asymptotic formula	*
dc.subject	bias	*
dc.subject	partition	*
dc.title	BIASES IN INTEGER PARTITIONS	*
dc.type	Article	*
dc.relation.issue	2	*
dc.relation.volume	104	*
dc.relation.index	SCIE	*
dc.relation.index	SCOPUS	*
dc.relation.startpage	177	*
dc.relation.lastpage	186	*
dc.relation.journaltitle	BULLETIN OF THE AUSTRALIAN MATHEMATICAL SOCIETY	*
dc.identifier.doi	10.1017/S0004972720001495	*
dc.identifier.wosid	WOS:000692795900003	*
dc.identifier.scopusid	2-s2.0-85099566407	*
dc.author.google	Kim, Byungchan	*
dc.author.google	Kim, Eunmi	*
dc.contributor.scopusid	김은미(56147492200)	*
dc.date.modifydate	20240311111612	*