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Some Results on Single Valued Neutrosophic Hypergroup [PDF]
, 2020 Preethi, D. +4 more
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On Neutrosophic Canonical Hypergroups and Neutrosophic Hyperrings [PDF]
, 2014 Agboola, A.A.A., Davvaz, B.
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On fuzzy subsets in $$\Gamma $$ Γ -semihypergroup through left operator semihypergroup
Afrika Matematika, 2018zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Kostaq Hila +2 more
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On Complementable Semihypergroups
Communications in Algebra, 2016In this article, we first introduce the notion of complementable semihypergroup, proving that the classes of simplifiable semigroups, groups, simplifiable semihypergroups, and complete hypergroups are examples of complementable semihypergroups. Then we define when two semihypergroups are disjoint and find examples of such semihypergroups.
Hossein Aghabozorgi +2 more
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Semilattice relations on a semihypergroup
AIMS Mathematics, 2023 <abstract><p>In this paper, we give a unified method for constructing commutative relations, band relations and semilattice relations on a semihypergroup. Moreover, we show that the set of all commutative relations, the set of all band relations and the set of all semilattice relations on a semihypergroup are complete lattices.</p><
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Decision-Making Algorithm of Rough Soft Γ-Semihypergroups and Associated Rough Soft Semihypergroups
New Mathematics and Natural Computation, 2023In this paper, we apply soft rough sets to the special algebraic hyperstructure and give the concepts of soft rough [Formula: see text]-semihypergroup, which is an extended definition of rough groups and we use the terminologies of [Formula: see text]-soft sets and [Formula: see text]-soft sets to research soft rough algebraic hyperstructures.
N. Rakhsh Khorshid +1 more
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Russian Academy of Sciences. Sbornik Mathematics, 1993
Let \(G\) be a locally compact Hausdorff space, \(\varepsilon_ x\) a probability measure concentrated in the point \(x\in G\), \({\mathfrak A}\) be the algebra of all finite measures on \(G\) with respect to the convolution \(*\). A semihypergroup \((G,*)\) is called a regular semihypergroup if a) There exists a two-sided neutral element \(\varepsilon_
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Let \(G\) be a locally compact Hausdorff space, \(\varepsilon_ x\) a probability measure concentrated in the point \(x\in G\), \({\mathfrak A}\) be the algebra of all finite measures on \(G\) with respect to the convolution \(*\). A semihypergroup \((G,*)\) is called a regular semihypergroup if a) There exists a two-sided neutral element \(\varepsilon_
openaire +1 more source