Add to ORKGIn the mathematical analysis, there are some theorems and definitions that established for both real and fuzzy numbers. In this study, we try to prove Bernoulli's inequality in fuzzy real numbers with some of its applications. Also, we prove two other theorems in fuzzy real numbers which are proved before, for real numbers
In this paper we present two theorems that rely on the Zadeh’s extension principle. These two theore...
The difference sequence space of fuzzy real numbers for both 1 ≤ p < 8 and 0 <...
We study the following problem: If # 1 , # 2 , . . . are fuzzy numbers with modal values M 1 , M 2 ,...
A general approach to the concept of fuzzy number associated to a generalized equality on the real l...
summary:Hong and Do[4] improved Mareš[7] result about additive decomposition of fuzzy quantities con...
AbstractFuzzy random variables have been introduced by Puri and Ralescu as an extension of random se...
This thesis presents an introduction to fuzzy numbers. It deals with the basic concepts of fuzzy num...
summary:The notions of a $t$-norm and of a fuzzy number are recalled. The law of large numbers for f...
Mathematical models are often used to describe physical realities. However, the physical realities a...
In this paper, we extend the concepts of statistical limit superior and limit inferior (as introduce...
Two different definitions of a Fuzzy number may be found in the literature. Both fulfill Goguen's Fu...
The question of solving mathematical relationships involving fuzzy relations and numbers is investig...
Convex analysis is a discipline of mathematics dedicated to the explication of the properties of con...
Fuzzy numbers are a mathematical concept used to deal with uncertainty in decision-making. They are ...
[[abstract]]The new attempt of weak and strong law of large numbers for fuzzy random variables is di...
In this paper we present two theorems that rely on the Zadeh’s extension principle. These two theore...
The difference sequence space of fuzzy real numbers for both 1 ≤ p < 8 and 0 <...
We study the following problem: If # 1 , # 2 , . . . are fuzzy numbers with modal values M 1 , M 2 ,...
A general approach to the concept of fuzzy number associated to a generalized equality on the real l...
summary:Hong and Do[4] improved Mareš[7] result about additive decomposition of fuzzy quantities con...
AbstractFuzzy random variables have been introduced by Puri and Ralescu as an extension of random se...
This thesis presents an introduction to fuzzy numbers. It deals with the basic concepts of fuzzy num...
summary:The notions of a $t$-norm and of a fuzzy number are recalled. The law of large numbers for f...
Mathematical models are often used to describe physical realities. However, the physical realities a...
In this paper, we extend the concepts of statistical limit superior and limit inferior (as introduce...
Two different definitions of a Fuzzy number may be found in the literature. Both fulfill Goguen's Fu...
The question of solving mathematical relationships involving fuzzy relations and numbers is investig...
Convex analysis is a discipline of mathematics dedicated to the explication of the properties of con...
Fuzzy numbers are a mathematical concept used to deal with uncertainty in decision-making. They are ...
[[abstract]]The new attempt of weak and strong law of large numbers for fuzzy random variables is di...
In this paper we present two theorems that rely on the Zadeh’s extension principle. These two theore...
The difference sequence space of fuzzy real numbers for both 1 ≤ p < 8 and 0 <...
We study the following problem: If # 1 , # 2 , . . . are fuzzy numbers with modal values M 1 , M 2 ,...