Add to ORKGIn this paper we define a new class of algebra we call it a non associative seminear ring with BCK algebra and define a non associative sub seminear ring with BCK algebra , then we study and prove some properties of them
summary:A ring or an idempotent semiring is associative provided that additive endomorphisms are mul...
An implication semigroup is an algebra of type (2, 0) with a binary operation → and a 0-ary operatio...
Embedding one class of structures into another usually brings better understand-ing of the former cl...
In this paper we define a new class of algebra we call it a non associative seminear ring with ...
summary:In this note we show that a subtraction algebra is equivalent to an implicative $BCK$-algebr...
In this paper we investigate Bol-Moufang identities in a more general and very natural setting, \tex...
The notion of a Boolean algebra with operators (BAO) was first defined by Jonsson and Tarski in 1951...
In this book for the first time we introduce the notion of subset non associative semirings. It is p...
In this research we survey and introduce some concepts of semirings, as a bi-ideal simple semirings,...
summary:A subtraction semigroup is a semigroup $(A,\ldotp,-)$ with a further operation "$-$" added, ...
The idea of a seminear-ring was introduced in [9], as an algebraic system that can be constructed f...
An associative ring is just realized or built using reals or complex; finite or infinite by defining...
For a commutative semiring S, by an S-algebra we mean a commutative semiring A equipped with a homom...
this paper we introduce the concept of Smarandache non-associative rings, which we shortly denote as...
A BCK-algebra is an algebraic structure of a set X with one binary operation. A KS-semigroup is a se...
summary:A ring or an idempotent semiring is associative provided that additive endomorphisms are mul...
An implication semigroup is an algebra of type (2, 0) with a binary operation → and a 0-ary operatio...
Embedding one class of structures into another usually brings better understand-ing of the former cl...
In this paper we define a new class of algebra we call it a non associative seminear ring with ...
summary:In this note we show that a subtraction algebra is equivalent to an implicative $BCK$-algebr...
In this paper we investigate Bol-Moufang identities in a more general and very natural setting, \tex...
The notion of a Boolean algebra with operators (BAO) was first defined by Jonsson and Tarski in 1951...
In this book for the first time we introduce the notion of subset non associative semirings. It is p...
In this research we survey and introduce some concepts of semirings, as a bi-ideal simple semirings,...
summary:A subtraction semigroup is a semigroup $(A,\ldotp,-)$ with a further operation "$-$" added, ...
The idea of a seminear-ring was introduced in [9], as an algebraic system that can be constructed f...
An associative ring is just realized or built using reals or complex; finite or infinite by defining...
For a commutative semiring S, by an S-algebra we mean a commutative semiring A equipped with a homom...
this paper we introduce the concept of Smarandache non-associative rings, which we shortly denote as...
A BCK-algebra is an algebraic structure of a set X with one binary operation. A KS-semigroup is a se...
summary:A ring or an idempotent semiring is associative provided that additive endomorphisms are mul...
An implication semigroup is an algebra of type (2, 0) with a binary operation → and a 0-ary operatio...
Embedding one class of structures into another usually brings better understand-ing of the former cl...