2022
DOI: 10.37863/umzh.v74i4.6626
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Zariski topology over multiplication Krasner hypermodules

Abstract: UDC 512.5 In this paper, we introduce the notion of multiplication Krasner hypermodules over commutative hyperrings and topologize the collection of all multiplication Кrasner hypermodules. In addition, we investigate some properties of this topological space.

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Cited by 2 publications
(6 citation statements)
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“…Recall from [17] that a hypermodule N is called multiplication S-hypermodule if for each subhypermodule K of N, there is a hyperideal J of S so that K = [J.N].…”
Section: Condition Of Pseudo-prime For Commutative Krasner Hypermodulesmentioning
confidence: 99%
See 2 more Smart Citations
“…Recall from [17] that a hypermodule N is called multiplication S-hypermodule if for each subhypermodule K of N, there is a hyperideal J of S so that K = [J.N].…”
Section: Condition Of Pseudo-prime For Commutative Krasner Hypermodulesmentioning
confidence: 99%
“…We use denoting N as a topological S-hypermodule in the rest of this text. In [17], we investigate the Zariski topology over multiplication hypermodules. Zariski topology is built on topological modules in [14].…”
Section: Pseudo-prime Spectrum Over Topological Hypermodulesmentioning
confidence: 99%
See 1 more Smart Citation
“…Recall from [11] that a hypermodule N is multiplication S-hypermodule if, for each subhypermodule K of N, there exists a hyperideal J of S with K =…”
Section: Definitionmentioning
confidence: 99%
“…Hypergroup theory, which was defined in [1] as a more comprehensive algebraic structure of group theory, has been investigated by different authors in modern algebra. It has been developed using hyperring and hypermodule theory studies by many authors in a series of papers [1][2][3][4][5][6][7][8][9][10][11][12][13][14][15]. Following these papers, let us start by giving the basic information necessary for the algebraic structure that we will study as Krasner S-hypermodule in studying the S-hypermodule class on a fixed Krasner hyperring class S. Let N be a nonempty set; (N, •) is called a hypergroupoid if for the map defined as • : N × N −→ P * (N) is a function.…”
Section: Introductionmentioning
confidence: 99%