Javascript must be enabled to continue!

Ideals and Bosbach States on Residuated Lattices

In random experiments, the fact that the sets of events has a structure of a Boolean algebra, i.e. it follows the rules of classical logic, is the main hypothesis of classical probability theory. Bosbach states have been introduced on commutative and non-commutative algebras of fuzzy logics as a way of probabilistically evaluating the formulas. In this paper, we focus on the relationship between some properties of ideals and Bosbach states in the framework of commutative residuated lattices. In particular, we introduce the concept of co-kernel of a Bosbach state which is an ideal and we establish the relationship between the notion of co-kernel and the kernel. Moreover, we define and characterize maximal ideals and maximal MV-ideals in residuated lattices.

World Scientific Pub Co Pte Lt

Francis Woumfo Blaise B. Koguep Njionou Etienne R. Temgoua Alomo Celestin Lele

New Mathematics and Natural Computation

2021

Title: Ideals and Bosbach States on Residuated Lattices

Description:

In random experiments, the fact that the sets of events has a structure of a Boolean algebra, i.

it follows the rules of classical logic, is the main hypothesis of classical probability theory.

Bosbach states have been introduced on commutative and non-commutative algebras of fuzzy logics as a way of probabilistically evaluating the formulas.

In this paper, we focus on the relationship between some properties of ideals and Bosbach states in the framework of commutative residuated lattices.

In particular, we introduce the concept of co-kernel of a Bosbach state which is an ideal and we establish the relationship between the notion of co-kernel and the kernel.

Moreover, we define and characterize maximal ideals and maximal MV-ideals in residuated lattices.

Back

Related Results

Mp-Residuated Lattices

This paper is devoted to the study of a fascinating class of residuated lattices, the so-called mp-residuated lattice, in which any prime ﬁlter contains a unique minimal prime ﬁlte...

S-Ideals: A Unified Framework for Ideal Structures via Multiplicatively Closed Subsets

In this paper, we study ideals defined with respect to arbitrary multiplicatively closed subsets S⊆R of a commutative ring R. An ideal I⊆R is called an S-ideal if for all a,b∈R, th...

Unbounded Star Convergence in Lattices

Let L be a vector lattice, "(" x_α ") " be a L-valued net, and x∈L . If |x_α-x|∧u→┴o 0 for every u ∈〖 L〗_+ then it is said that the net "(" x_α ")" unbounded order converges ...

Internal states on pseudo $L$-algebras

In this paper we introduces internal states on pseudo $L$-algebras. Firstly, we introduce the notions of internal states of type I and type II on pseudo $L$-algebras, and we also i...

Free mu-lattices

A mu-lattice is a lattice with the property that every unary <br />polynomial has both a least and a greatest fix-point. In this paper<br />we define the quasivariety o...

Ambiguities in powder pattern indexing: A ternary lattice metric singularity

A lattice metric singularity occurs when unit cells defining two (or more) lattices yield the identical set of unique calculated d-spacings. The existence of such singularities, th...

COUPLING OSCILLATIONS OF LATTICES OF DIFFERENT DIELECTRIC RESONATORS

Background. The development of many elements of modern communication systems is increasingly based on the use of various types of dielectric resonators (DR). The theory of coupled ...

Traces, ideals, and arithmetic means

This article grew out of recent work of Dykema, Figiel, Weiss, and Wodzicki (Commutator structure of operator ideals) which inter alia characterizes commuta...

Email:
Password:

Email: