Results 321 to 330 of about 5,068,812 (361)
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On - continuous in topological spaces of neutrosophy
Journal of Interdisciplinary Mathematics, 2021This paper mainly focuses on incorporating the idea of continuous functions in neutrosophic topological spaces. We are also studying their features and looking at their properties.
A. Nivetha +3 more
semanticscholar +1 more source
Introduction to Topology, 2019
Book file PDF easily for everyone and every device. You can download and read online Topological Spaces file PDF Book only if you are registered here. And also you can download or read online all Book PDF file that related with Topological Spaces book ...
T. Singh
semanticscholar +3 more sources
Book file PDF easily for everyone and every device. You can download and read online Topological Spaces file PDF Book only if you are registered here. And also you can download or read online all Book PDF file that related with Topological Spaces book ...
T. Singh
semanticscholar +3 more sources
On DG-topological spaces associated with directed graphs
, 2020In this research the aims we introduction of new concepts in topological spaces named DG- topological spaces topology associated with digraphs induced by new open set called DG-open set and investigated some properties of this concepts by the closed ...
Khalid Shea Khaiarallha Al’Dzhabri +2 more
semanticscholar +1 more source
2006
Publisher Summary This chapter provides an overview of the topological spaces. A topological space (X, τ) is a set X with a topology τ, that is, a collection of subsets of X with the following properties: (1) X ∈ τ, o ∈ τ; (2) if A, B ∈ τ then A ∩ B ∈ τ ; and (3) for any collection {Aα}α, if all Aα ∈ τ , then UαAα ∈ τ .
Elena Deza, Michel-Marie Deza
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Publisher Summary This chapter provides an overview of the topological spaces. A topological space (X, τ) is a set X with a topology τ, that is, a collection of subsets of X with the following properties: (1) X ∈ τ, o ∈ τ; (2) if A, B ∈ τ then A ∩ B ∈ τ ; and (3) for any collection {Aα}α, if all Aα ∈ τ , then UαAα ∈ τ .
Elena Deza, Michel-Marie Deza
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Topology and Topological Spaces
1997We have now seen four different proofs of the Fundamental Theorem of Algebra. The first two were purely analysis, while the second pair involved a wide collection of algebraic ideas. However, we should realize that even in these algebraic proofs we did not totally leave analysis.
Gerhard Rosenberger, Benjamin Fine
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Semi-Open Sets and Semi-Continuity in Topological Spaces
, 1963(1963). Semi-Open Sets and Semi-Continuity in Topological Spaces. The American Mathematical Monthly: Vol. 70, No. 1, pp. 36-41.
N. Levine
semanticscholar +1 more source
Triangulating topological spaces
Proceedings of the tenth annual symposium on Computational geometry - SCG '94, 1994Given a subspace [Formula: see text] and a finite set S⊆ℝd, we introduce the Delaunay complex, [Formula: see text], restricted by [Formula: see text]. Its simplices are spanned by subsets T⊆S for which the common intersection of Voronoi cells meets [Formula: see text] in a non-empty set. By the nerve theorem, [Formula: see text] and [Formula: see text]
Herbert Edelsbrunner, Nimish R. Shah
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Topological Vector Spaces [PDF]
, 1982 Vector spaces will be considered as vector spaces over ℂ unless something else is specified. The symbols Hom(X, Y) resp. Sur(X, Y) will be reserved for sets of continuous homomorphisms resp. surjective homomor-phisms; End(X) is the set of continuous endomorphisms and Aut(E) is the set of continuous automorphisms (bijective and bicontinuous ...
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On Neutrosophic Semi-Open sets in Neutrosophic Topological Spaces
, 2016The purpose of this paper is to define the product related neutrosophic topological space and proved some theorems based on this. We introduce the concept of neutrosophic semi-open sets and neutrosophic semi-closed sets in neutrosophic topological spaces
P. Iswarya, Dr. K. Bageerathi
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1966
Publisher Summary This chapter defines topological spaces and the related theorems. The condition for a set A to be open in a metric space is that each point of A belongs to an open ball contained in A. A space that contains no other closed-open subset is called connected. The union of two closed sets is a closed set.
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Publisher Summary This chapter defines topological spaces and the related theorems. The condition for a set A to be open in a metric space is that each point of A belongs to an open ball contained in A. A space that contains no other closed-open subset is called connected. The union of two closed sets is a closed set.
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