Results 71 to 80 of about 133 (91)
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Unifing the prime and primary hyperideals under one frame in a Krasner (m, n)-hyperring
Communications in Algebra, 2021Prime hyperideals and primary hyperideals as two of the most important structures in a Krasner (m, n)-hyperring are defferent from each other in many aspects.
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\(n\)-absorbing \(I\)-prime hyperideals in multiplicative hyperrings
Summary: In this paper, we define the concept \(I\)-prime hyperideal in a multiplicative hyperring \(R\). A proper hyperideal \(P\) of \(R\) is an \(I\)-prime hyperideal if for \(a, b \in R\) with \(ab \subseteq P-IP\) implies \(a \in P\) or \(b \in P\). We provide some characterizations of \(I\)-prime hyperideals.Mena, Ali Abdullah, Akray, Ismael
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Hyperideal polyhedra in the 3-dimensional anti-de Sitter space
Advances in Mathematics, 2022Jean-Marc Schlenker
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(Weakly) $(α,β)$-prime hyperideals in commutative multiplicative hypeering
Let $H$ be a commutative multiplicative hyperring and $α, β\in \mathbb{Z}^+$. A proper hyperideal $P$ of $H$ is called (weakly) $(α,β)$-prime if $x^α\circ y \subseteq P$ for $x,y \in H$ implies $x^β\subseteq P$ or $y \in P$. In this paper, we aim to investigate (weakly) $(α,β)$-prime hyperideals and then we present some properties of them.openaire +1 more source
Unifing the prime and primary hyperideals under one frame in a Krasner (m, n)-hyperring
Communications in Algebra, 2021exaly
A novel investigation on fuzzy hyperideals in ordered $$*$$-semihypergroups
Computational and Applied Mathematics, 2021Naveed Yaqoob, Yaqoob Naveed
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Fuzzy set approach to hyperideal theory of po-ternary semihypergroups
Journal of Discrete Mathematical Sciences and Cryptography, 2019Kostaq Hila
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On 2-absorbing and 2-absorbing primary hyperideals of a multiplicative hyperring
Cogent Mathematics, 2017exaly