On generalized soft equality and soft lattice structure

Please be advised that the site will be down for maintenance on Sunday, September 1, 2024, from 08:00 to 18:00, and again on Monday, September 2, 2024, from 08:00 to 09:00. We apologize for any inconvenience this may cause.

Show simple item record

dc.contributor.author Abbas, Mujahid
dc.contributor.author Ali, Basit
dc.contributor.author Romaguera, Salvador
dc.date.accessioned 2015-02-06T07:23:26Z
dc.date.available 2015-02-06T07:23:26Z
dc.date.issued 2014
dc.description.abstract Molodtsov introduced soft sets as a mathematical tool to handle uncertainty associated with real world data based problems. In this paper we propose some new concepts which generalize existing comparable notions. We introduce the concept of generalized soft equality (denoted as g-soft equality) of two soft sets and prove that the so called lower and upper soft equality of two soft sets imply g-soft equality but the converse does not hold. Moreover we give tolerance or dependence relation on the collection of soft sets and soft lattice structures. Examples are provided to illustrate the concepts and results obtained herein. en_ZA
dc.description.librarian hb2015 en_ZA
dc.description.uri http://www.pmf.ni.ac.rs/filomat en_ZA
dc.identifier.citation Abbas, M, Ali, B & Romaguera, S 2014, 'On generalized soft equality and soft lattice structure', Filomat, vol. 28, no. 6, pp. 1191-1203. en_ZA
dc.identifier.issn 0354-5180 (print)
dc.identifier.other 10.2298/FIL1406191A
dc.identifier.uri http://hdl.handle.net/2263/43570
dc.language.iso en en_ZA
dc.publisher University of Nis en_ZA
dc.rights University of Nis en_ZA
dc.subject Soft set en_ZA
dc.subject G-soft set en_ZA
dc.subject G-null soft set en_ZA
dc.subject G-soft equality en_ZA
dc.subject Union en_ZA
dc.subject Intersection en_ZA
dc.subject Generalized soft equality en_ZA
dc.title On generalized soft equality and soft lattice structure en_ZA
dc.type Article en_ZA


Files in this item

This item appears in the following Collection(s)

Show simple item record