Results 211 to 220 of about 2,125 (259)

A note on the space of fuzzy measurable functions for a monotone measure

open access: yesFuzzy Sets and Systems, 2011
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Chong Wu 0001, Xuekun Ren, Congxin Wu
exaly   +4 more sources

On the completeness of fuzzy measure-space

Fuzzy Sets and Systems, 1999
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Yian-Kui Liu, Guangquan Zhang 0001
exaly   +2 more sources

On the existence of probability measures on fuzzy measurable spaces

Fuzzy Sets and Systems, 1991
An \(F\)-quantum space [see the author and the reviewer, Fuzzy Sets Syst. 39, No. 1, 65-73 (1991)] is a couple \((X,M)\), where \(X\neq\emptyset\) and \(M\subset\langle 0,1\rangle^ X\) such that \(1_ X\in M\), \((1/2)_ X\not\in M\), \(f\in M\) implies \(1-f\in M\) and \(f_ n\in M\) \((n=1,2,\dots)\) implies \(\sup_ n f_ n\in M\). A probability on \(M\)
Anatolij Dvurečenskij
exaly   +3 more sources

Measurable Functions on Fuzzy Measure Spaces

1992
In this chapter, let (X, ℱ) be a measurable space, μ: F → [0, ∞] be a fuzzy measure (or semicontinuous fuzzy measure), and B be the Borel field on (−∞, ∞).
Wang Zhenyuan, Klir George J
exaly   +2 more sources

Convergence of sequence of measurable functions on fuzzy measure spaces

Fuzzy Sets and Systems, 1997
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Masami Yasuda, Qingshan Jiang
exaly   +3 more sources

Fundamental convergence of sequences of measurable functions on fuzzy measure space

Fuzzy Sets and Systems, 1998
A fuzzy measure is considered as a monotone, continuous (from above and from below) extended real-valued function \(m\) defined on a \(\sigma\)-algebra such that \(m(\emptyset)=0\). It is said to be asymptotically null-additive, if \(m(A_n\cup B_m) \to 0\) \((n\to \infty,\;m\to \infty)\) whenever \(m(A_n) \to 0\) and \(m(B_m)\to 0\).
Ha Minghu, Wang Xizhao, Wu Congxin
exaly   +2 more sources

Convergence of a sequence of fuzzy number-valued fuzzy measurable functions on the fuzzy number-valued fuzzy measure space

Fuzzy Sets and Systems, 1993
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
exaly   +3 more sources

Space of fuzzy measures and convergence

Fuzzy Sets and Systems, 2003
Using the Choquet integral, two topologies in the space of fuzzy measures are introduced and thus also the related convergences. Moreover, the convergence by variation norm is introduced and discussed. The relationship of these three types of convergences in the space of fuzzy measures is investigated.
Yasuo Narukawa   +2 more
openaire   +1 more source

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