On generalized soft equality and soft Lattice structure

Abbas, Mujahid; Ali, Basit; Romaguera, Salvador

doi:10.2298/fil1406191a

Cited by 14 publications

(25 citation statements)

References 27 publications

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“…Employing these notions, they proved results given in [2]. Recently [1], we have generalized some of the above concepts by means of the notions of −soft subset and of −soft equality. One of the advantages of soft set theory is that it provides enough parameters to handle fuzziness in the data.…”

Section: Preliminariesmentioning

confidence: 85%

“…In [1] we presented the notions of −null soft set, −soft subset and −soft equality of two soft sets by relaxing the conditions on the underlying parameter subsets of E. Consequently, we generalized already known comparable notions (for example, Definitions 2.2, 2.3, and 2.7 above).…”

Section: Definition 27 ([26]) Suppose Thatmentioning

confidence: 99%

“…It was also proved in [1] that lower and upper soft equalities (≈ s and ≈ s ) of two soft sets implies the −soft equality , but −soft equality implies neither lower soft equality nor upper soft equality.…”

Section: Definition 210 ([17])mentioning

confidence: 99%

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Generalized operations in soft set theory via relaxed conditions on parameters

Abbas

Ali

Romaguera

2017

Filomat

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Abstract. Soft set theory has been evolved as a very useful mathematical tool to handle uncertainty and ambiguity associated with the real world data based structures. Parameters with certain conditions have been used to classify the data with the help of suitable functions. The aim of this paper is to relax conditions on parameters which lead us to propose some new concepts that consequently generalize existing comparable notions. We introduce the concepts of generalized finite soft equality ( f −soft equality), generalized finite soft union ( f −soft union) and generalized finite soft intersection ( f −soft intersection) of two soft sets. We prove results involving operations introduced herein. Moreover, with the help of examples, it is shown that these operations are proper generalizations of existing comparable operations.

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Section: Preliminariesmentioning

confidence: 85%

Section: Definition 27 ([26]) Suppose Thatmentioning

confidence: 99%

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Generalized operations in soft set theory via relaxed conditions on parameters

Abbas

Ali

Romaguera

2017

Filomat

Self Cite

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“…Soft semigroups were touched in [6] and then extensively studied in [10] by means of soft relations. Soft sets were applied to soft ordered semigroups by Jun et al [11] and a lattice structure on soft sets was considered in [1]. Recently on this area some new papers appeared, such as [9,13].…”

Section: Introductionmentioning

confidence: 99%

A categorical approach to soft S-acts

Shirmohammadi¹,

Rasouli²

2017

Filomat

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The purpose of this paper is to study certain categorical properties of the categories SoftAct of all soft S-acts and soft homomorphisms, and WSoftAct of all soft S-acts and weak soft homomorphisms. We investigate the interrelations of some particular morphisms, limits and colimits in SoftAct and WSoftAct with their corresponding notions in the categories ActS and Set. It is proved that SoftAct has non-empty soft coproducts and soft coequalizers and then soft pushouts. Moreover, WSoftAct has arbitrary w-soft products and non-empty w-soft coproducts. Some results concerning soft equalizers and w-soft pullbacks are also presented.

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“…Maji et al [14] introduced some basic algebraic operations on soft sets. Abbas et al [3] proposed tolerance or dependence relation on the collection of soft sets and soft lattice structure. The concept of soft set relations as a soft subset of the Cartesian product of soft sets was introduced by Babitha and Sunil [4].…”

Section: Introductionmentioning

confidence: 99%

A soft version of the Knaster–Tarski fixed point theorem with applications

Leyew

Abbas

2017

J. Fixed Point Theory Appl.

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In this paper first we define a partial order on a soft set (F, A) and introduce some related concepts. Then using the concept of a soft mapping introduced by Babitha and Sunil [Comput. Math. Appl., 60 (7) (2010), 1840-1849], a soft version of Knaster-Tarski fixed point theorem is obtained. Some examples are presented to support the concepts introduced and the results proved herein. As an application of our result, we show that the soft Knaster-Tarski fixed point theorem ensures the existence of a soft common fixed point for a commuting family of order-preserving soft mappings.

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On generalized soft equality and soft Lattice structure

Cited by 14 publications

References 27 publications

Generalized operations in soft set theory via relaxed conditions on parameters

Generalized operations in soft set theory via relaxed conditions on parameters

A categorical approach to soft S-acts

A soft version of the Knaster–Tarski fixed point theorem with applications

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