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In this paper we study primary elements in Prüfer lattices and characterize $α$ -lattices in terms of Prüfer lattices. Next we study weak ZPI-lattices and characterize almost principal element lattices and principal element lattices in terms of ZPI-lattices.

Prime ideals and polars in DR $ℓ$ -monoids and BL-algebras

Jan Kühr (2003)

Mathematica Slovaca

Prime ideals in autometrized algebras

Jiří Rachůnek (1987)

Czechoslovak Mathematical Journal

Prime radical theorem on ordered semigroups.

C.S. Hoo, K.P. Shum (1980)

Semigroup forum

Prime, weakly prime and almost prime elements in multiplication lattice modules

Emel Aslankarayigit Ugurlu, Fethi Callialp, Unsal Tekir (2016)

Open Mathematics

In this paper, we study multiplication lattice modules. We establish a new multiplication over elements of a multiplication lattice module.With this multiplication, we characterize idempotent element, prime element, weakly prime element and almost prime element in multiplication lattice modules.

Products of partially ordered quasigroups

Milan Demko (2008)

Commentationes Mathematicae Universitatis Carolinae

We describe necessary and sufficient conditions for a direct product and a lexicographic product of partially ordered quasigroups to be a positive quasigroup. Analogous questions for Riesz quasigroups are studied.

Pseudo $B L$ -algebras and $D R ℓ$ -monoids

Jan Kühr (2003)

Mathematica Bohemica

It is shown that pseudo $B L$ -algebras are categorically equivalent to certain bounded $D R ℓ$ -monoids. Using this result, we obtain some properties of pseudo $B L$ -algebras, in particular, we can characterize congruence kernels by means of normal filters. Further, we deal with representable pseudo $B L$ -algebras and, in conclusion, we prove that they form a variety.

Pseudo-complemented distributive groupoids

Donald Joseph Hansen (1991)

Czechoslovak Mathematical Journal

Pseudocomplements in sum-ordered partial semirings

Jānis Cīrulis (2007)

Discussiones Mathematicae - General Algebra and Applications

We study a particular way of introducing pseudocomplementation in ordered semigroups with zero, and characterise the class of those pseudocomplemented semigroups, termed g-semigroups here, that admit a Glivenko type theorem (the pseudocomplements form a Boolean algebra). Some further results are obtained for g-semirings - those sum-ordered partially additive semirings whose multiplicative part is a g-semigroup. In particular, we introduce the notion of a partial Stone semiring and show that several...

Pseudoorder in ordered semigroups.

N. Kehayopulu, M. Tsingelis (1995)

Semigroup forum

Quelques propriétés des 0-demi-groupes périodiques

Thérèse Merlier (1971/1972)

Séminaire Dubreil. Algèbre et théorie des nombres

Quelques propriétés des anneaux dont un sous-demi-groupe multiplicatif est un $𝒪$ -demi-groupe

Thérèse Merlier (1973/1974)

Séminaire Dubreil. Algèbre et théorie des nombres

$R_{0}$ -algebras and weak dually residuated lattice ordered semigroups

Liu Lianzhen, Li Kaitai (2006)

Czechoslovak Mathematical Journal

We introduce the notion of weak dually residuated lattice ordered semigroups (WDRL-semigroups) and investigate the relation between $R_{0}$ -algebras and WDRL-semigroups. We prove that the category of $R_{0}$ -algebras is equivalent to the category of some bounded WDRL-semigroups. Moreover, the connection between WDRL-semigroups and DRL-semigroups is studied.

Radicals and complete distributivity in relatively normal lattices

Jiří Rachůnek (2003)

Mathematica Bohemica

Lattices in the class $ℐℛ𝒩$ of algebraic, distributive lattices whose compact elements form relatively normal lattices are investigated. We deal mainly with the lattices in $ℐℛ𝒩$ the greatest element of which is compact. The distributive radicals of algebraic lattices are introduced and for the lattices in $ℐℛ𝒩$ with the sublattice of compact elements satisfying the conditional join-infinite distributive law they are compared with two other kinds of radicals. Connections between complete distributivity of algebraic...

Rational algebra and MM functions

Ray A. Cuninghame-Green (2003)

Kybernetika

MM functions, formed by finite composition of the operators min, max and translation, represent discrete-event systems involving disjunction, conjunction and delay. The paper shows how they may be formulated as homogeneous rational algebraic functions of degree one, over (max, +) algebra, and reviews the properties of such homogeneous functions, illustrated by some orbit-stability problems.

Rational semimodules over the max-plus semiring and geometric approach to discrete event systems

Stéphane Gaubert, Ricardo Katz (2004)

Kybernetika

We introduce rational semimodules over semirings whose addition is idempotent, like the max-plus semiring, in order to extend the geometric approach of linear control to discrete event systems. We say that a subsemimodule of the free semimodule $𝒮^{n}$ over a semiring $𝒮$ is rational if it has a generating family that is a rational subset of $𝒮^{n}$ , $𝒮^{n}$ being thought of as a monoid under the entrywise product. We show that for various semirings of max-plus type whose elements are integers, rational semimodules...

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