ON WIJSMAN I− LACUNARY STATISTICAL EQUIVALENCE OF ORDER (η, µ)

dc.contributor.author	Şengül, Hacer
dc.date.accessioned	2019-06-12T08:15:38Z
dc.date.available	2019-06-12T08:15:38Z
dc.date.issued	2018
dc.identifier.issn	2217-4303
dc.identifier.uri	http://hdl.handle.net/11513/193
dc.description.abstract	The idea of asymptotically equivalent sequences and asymptotic regular matrices was introduced by Marouf [ Marouf, M. Asymptotic equivalence and summability, Int. J. Math. Sci. 16(4) 755-762 (1993) ] and Patterson [ Patterson, RF. On asymptotically statistically equivalent sequences, Demonstr. Math. 36(1), 149-153 (2003) ] extended these concepts by presenting an asymptotically statistical equivalent analog of these definitions and natural regularity conditions for nonnegative summability matrices. In this paper we introduce the concepts of Wijsman asymptotically I−lacunary statistical equivalence of order (η, µ) and strongly asymptotically I−lacunary equivalence of order (η, µ) of sequences of sets and investigated between their relationship.	en_US
dc.language.iso	en	en_US
dc.publisher	Journal of Inequalities and Special Functions (JIASF)	en_US
dc.subject	I−convergence; asymptotical equivalent; lacunary sequence; I−statistical convergence; Wijsman convergence; sequences of sets.	en_US
dc.title	ON WIJSMAN I− LACUNARY STATISTICAL EQUIVALENCE OF ORDER (η, µ)	en_US
dc.type	Article	en_US