Results 1  10
of
142
On Fuzzy Real Valued I Convergent Double Sequence Spaces
"... Abstract: In this article we introduce the different types of fuzzy realvalued Iconvergent double sequence spaces. Also study their topological and algebraic properties like solidness, symmetricity etc. Key Words: Fuzzy number; ideal; Iconvergent; solid space; symmetric space; convergence free; s ..."
Abstract
 Add to MetaCart
Abstract: In this article we introduce the different types of fuzzy realvalued Iconvergent double sequence spaces. Also study their topological and algebraic properties like solidness, symmetricity etc. Key Words: Fuzzy number; ideal; Iconvergent; solid space; symmetric space; convergence free
Lacunary IConvergent Sequences of Fuzzy Real Numbers.
"... In this article we introduce the concept of lacunary Iconvergent sequence of fuzzy real numbers and the spaces and. We also obtain some inclusion relations between these spaces. F Ic) ( θ F ..."
Abstract
 Add to MetaCart
In this article we introduce the concept of lacunary Iconvergent sequence of fuzzy real numbers and the spaces and. We also obtain some inclusion relations between these spaces. F Ic) ( θ F
Intuitionistic fuzzy Zweier Iconvergent double sequence spaces defined by modulus function
, 2016
"... Abstract: In this article, we introduce the intuitionistic fuzzy Zweier Iconvergent double sequence spaces 2 I ( , ) (f ) and 2 I 0( , ) (f ) defined by modulus function and study the fuzzy topology on the said spaces. ..."
Abstract

Cited by 1 (1 self)
 Add to MetaCart
Abstract: In this article, we introduce the intuitionistic fuzzy Zweier Iconvergent double sequence spaces 2 I ( , ) (f ) and 2 I 0( , ) (f ) defined by modulus function and study the fuzzy topology on the said spaces.
On Ideal Convergence of Sequences of Functions in Intuitionistic Fuzzy Normed Spaces
"... Abstract: In this work, our purpose is to introduce I−convergence of sequences of functions in intuitionistic fuzzy normed space by combining the I−convergence, the sequences of functions and the intuitionistic fuzzy normed spaces, and to investigate relations among concepts such as I−convergence, s ..."
Abstract

Cited by 1 (1 self)
 Add to MetaCart
Abstract: In this work, our purpose is to introduce I−convergence of sequences of functions in intuitionistic fuzzy normed space by combining the I−convergence, the sequences of functions and the intuitionistic fuzzy normed spaces, and to investigate relations among concepts such as I−convergence
ON (λ, µ)STATISTICAL CONVERGENCE OF DOUBLE SEQUENCES ON INTUITIONISTIC FUZZY NORMED SPACES
"... In this paper, we define (λ, µ) statistical convergence and (λ, µ)statistical Cauchy double sequences on intuitionistic fuzzy normed spaces (IFNS in short), where λ = (λn) and µ = (µm) be two nondecreasing sequences of positive real numbers such that each tending to ∞ and λn+1 ≤ λn+1, λ1 = 1; µm+ ..."
Abstract

Cited by 2 (1 self)
 Add to MetaCart
In this paper, we define (λ, µ) statistical convergence and (λ, µ)statistical Cauchy double sequences on intuitionistic fuzzy normed spaces (IFNS in short), where λ = (λn) and µ = (µm) be two nondecreasing sequences of positive real numbers such that each tending to ∞ and λn+1 ≤ λn+1, λ1 = 1; µm
I CONVERGENT SEQUENCE SPACES OF FUZZY REAL NUMBERS DEFINED BY SEQUENCE OF MODULUS FUNCTIONS
, 2014
"... Copyright © 2014 Das and Sarma. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited. Abstract: In this article our aim to introduce some n ..."
Abstract
 Add to MetaCart
new I convergent sequence spaces of fuzzy real numbers defined by sequence of modulus functions and studies some topological and algebraic properties. Also we establish some inclusion relations.
1 NEW CLASSES OF AI2 CONVERGENCE DOUBLE SEQUENCE SPACES OF FUZZY NUMBERS DEFINED BY SEQUENCE OF ORLICZ FUNCTIONS
, 2014
"... Copyright © 2014 Das and Sarma. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited. Abstract. In this article we introduce the spaces ( ..."
Abstract
 Add to MetaCart
Copyright © 2014 Das and Sarma. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited. Abstract. In this article we introduce the spaces
ANYTIME FUZZY CONTROLLER
, 2006
"... Fuzzy logic has been successfully applied in various fields. However, as fuzzy controllers increase in size and complexity, the number of control rules increases exponentially and realtime behavior becomes more difficult. This thesis introduces an anytime fuzzy controller. Much work has been done ..."
Abstract
 Add to MetaCart
Fuzzy logic has been successfully applied in various fields. However, as fuzzy controllers increase in size and complexity, the number of control rules increases exponentially and realtime behavior becomes more difficult. This thesis introduces an anytime fuzzy controller. Much work has been done
Normed Vector Spaces and Double Duals
, 2005
"... In this note we look at a number of infinitedimensional Rvector spaces that arise in analysis, and we consider their dual and double dual spaces. As an application, we give an example of an infinitedimensional vector space V for which the natural map η: V → V ∗ ∗ is not an isomorphism. In analysi ..."
Abstract
 Add to MetaCart
) ‖ = x21 + · · ·+ x2n. Recall that the set S of all real valued sequences is an Rvector space under pointwise addition and scalar multiplication. The next example gives a collection of subspaces of this sequence space. Example 2. For x = {xn} ∈ S, define, for p ≥ 1, ‖x‖p =
The Law of Large Numbers for Fuzzy Numbers
"... We study the following problem: If # 1 , # 2 , . . . are fuzzy numbers with modal values M 1 , M 2 , . . . , then what is the strongest tnorm for which lim n## Nes µ m n  # # # 1 + · · · + # n n # m n + # ¶ = 1, for any # > 0, where m n = M 1 + · · · +M n n , the arithmetic ..."
Abstract

Cited by 3 (1 self)
 Add to MetaCart
mean # 1 + · · · + # n n is defined via suptnorm convolution and Nes denotes necessity. Keywords: Possibility, probability, necessity, fuzzy number, triangular norm, law of large numbers, sequence of fuzzy numbers, convergence theorem. 1 Definitions A fuzzy number # is a fuzzy set of the real
Results 1  10
of
142