On a topological fuzzy fixed point theorem and its application to non-ejective fuzzy fractals

Authors :: Miroslav Rypka
Jan Andres
Source :: Fuzzy Sets and Systems. 350:95-106
Publication Year :: 2018
Publisher :: Elsevier BV, 2018.
Abstract: A topological fuzzy fixed point theorem is given, when generalizing and improving the main result by Diamond, Kloeden and Pokrovskii (1997) [1] . Apart from the sole existence, a weak local stability property, called non-ejectivity in the sense of Browder, of fuzzy fixed points is established. This theorem is then applied for obtaining non-ejective fuzzy fractals. An alternative approach via the Knaster–Tarski theorem is also presented.

Subjects :: Discrete mathematics
Picard–Lindelöf theorem
Logic
010102 general mathematics
Fixed-point theorem
02 engineering and technology
Fuzzy subalgebra
Fixed point
Topology
Fixed-point property
01 natural sciences
Artificial Intelligence
0202 electrical engineering, electronic engineering, information engineering
Fuzzy number
020201 artificial intelligence & image processing
0101 mathematics
Brouwer fixed-point theorem
Kakutani fixed-point theorem
Mathematics

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