From lattices to Hv-matrices

From lattices to Hv-matrices

In this paper we study the concept of sets of elements, related to results of an associative binary operation. We discuss this issue in the context of matrices and lattices. First of all, we define hyperoperations similar to those used when constructing hyperstructures from quasi-ordered semigroups....

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Bibliographic Details
Main Authors: Křehlík Štěpán, Novák Michal
Format: Article
Language:English
Published: Sciendo 2016-11-01
Series:Analele Stiintifice ale Universitatii Ovidius Constanta: Seria Matematica
Subjects:
distributive lattice
hv-matrix
hv-ring
join space
partially ordered semigroup.
primary 20n20
secondary 15b33
06e99
06d75
Online Access:https://doi.org/10.1515/auom-2016-0055
Description
Summary:In this paper we study the concept of sets of elements, related to results of an associative binary operation. We discuss this issue in the context of matrices and lattices. First of all, we define hyperoperations similar to those used when constructing hyperstructures from quasi-ordered semigroups. This then enables us to show that if entries of matrices are elements of lattices, these considerations provide a natural link between matrices, some basic concepts of the hyperstructure theory including Hv-rings and Hv-matrices and also one recent construction of hyperstructures.
ISSN:1844-0835

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