Results 11 to 20 of about 28,832 (242)
On some generated soft topological spaces and soft homogeneity [PDF]
Heliyon, 2019 We introduce soft homogeneity as an extension of homogeneity in ordinary topological spaces. Based on the generated soft topology of a given indexed family of classical topologies inspite of a one topology given by Terepeta in [16], we investigate soft ...
Samer Al Ghour, Awatef Bin-Saadon
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Soft 〖"Pre" 〗^*-Generalized Continuous Functions in Soft Topological Spaces
Ratio Mathematica, 2022 The aim of this paper is to define a new class of generalized continuous functions called soft -generalized continuous functions and soft -generalized irresolute functions in soft topological spaces. We discuss several characterizations of soft -generalized continuous and irresolute functions and also investigate their relationship with other soft ...
Reena, C, Karthika, M
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Soft Generalized αi-Closed Sets in Soft Topological Spaces
Journal of Physics: Conference Series, 2021 Abstract In the present paper, we introduced a new kind of soft generalized closed sets and soft generalized open sets are called soft generalized αi-closed sets and soft generalized αi-open sets. The relations among these two families and some other kinds of soft sets as like as soft generalized closed, soft generalized i-closed, soft ...
Sabih W. Askandar, Amir A. Mohammed
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Soft Ideal Theory Soft Local Function and Generated Soft Topological Spaces [PDF]
Applied Mathematics & Information Sciences, 2014 The purpose of this paper is to introduce the notion of soft ideal in soft set theory. The concept of soft local function is also introduced. These concepts are discussed with a view to find new soft topologies from the original one. The basic structure, especially a basis for such generated soft topologies also studied here.
A. Kandil +3 more
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Soft Rω-Open Sets and the Soft Topology of Soft δω-Open Sets
Axioms, 2022 The author devotes this paper to defining a new class of soft open sets, namely soft Rω-open sets, and investigating their main features. With the help of examples, we show that the class of soft Rω-open sets lies strictly between the classes of soft ...
Samer Al Ghour
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Poincar\'e-Verdier duality in o-minimal structures [PDF]
, 2010 Here we prove a Poincar\'e-Verdier duality theorem for the o-minimal sheaf cohomology with definably compact supports of definably normal, definably locally compact spaces in an arbitrary o-minimal structure.Comment: 23 pages, uses xy ...
Edmundo, Mario J., Prelli, Luca
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A non-linear theory of infrahyperfunctions [PDF]
, 2019 We develop a nonlinear theory for infrahyperfunctions (also referred to as quasianalytic (ultra)distributions by L. H\"{o}rmander). In the hyperfunction case our work can be summarized as follows.
Debrouwere, Andreas +2 more
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On Soft $\mu$-Compact Soft Generalized Topological Spaces
Journal of Uncertainty in Mathematics Science, 2014 The main purpose of this paper is to introduce soft $\mu$-compact soft generalized topological spaces as a generalization of compact spaces. A soft generalized topological space $(F_A, \mu)$ is soft $\mu$-compact if every soft $\mu$-open soft cover of $F_A$ admits a finite soft sub cover.
Sunil Jacob John, Jyothis Thomas
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Non-locality of zero-bias anomalies in the topologically-trivial phase of Majorana wires [PDF]
, 2014 We show that the topologically trivial zero bias peak (ZBP) emerging in semiconductor Majorana wires due to soft confinement exhibits correlated splitting oscillations as a function of the applied Zeeman field, similar to the correlated splitting of the ...
Stanescu, Tudor D., Tewari, Sumanta
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Soft regular generalized closed sets in soft topological spaces
International Journal of Mathematical Analysis, 2014 Many researchers defined some basic notions on soft topology and studied many properties. In this paper, we define soft regular generalized closed and open sets in soft topological spaces and studied their some properties. We introduce these concepts which are defined over an initial universe with a fixed set of parameters.
Yüksel S., Tozlu N., Ergül Z.G.
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