Adaptive Membership Functions and F-Transform

The definition of the fuzzy-transform (F-transform) has been limited mainly to 1-D signals and 2-D data due to the difficulty of defining membership functions, their centres, and support on a domain with arbitrary dimensionality and topology. We propose a novel method for the adaptive selection of t...

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Vydáno v:IEEE transactions on fuzzy systems Ročník 32; číslo 5; s. 2786 - 2796
Hlavní autoři: Cammarasana, Simone, Patane, Giuseppe
Médium: Journal Article
Jazyk:angličtina
Vydáno: New York IEEE 01.05.2024
The Institute of Electrical and Electronics Engineers, Inc. (IEEE)
Témata:
Adaptive systems
Computational efficiency
Continuity (mathematics)
Convolution
Data analysis
data-driven membership functions
Fuzzy systems
fuzzy-transform (F-transform)
Image reconstruction
Kernel
Minimization
radial basis functions
signal approximation
Topology
Weighted sum model
ISSN:1063-6706, 1941-0034
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Shrnutí:The definition of the fuzzy-transform (F-transform) has been limited mainly to 1-D signals and 2-D data due to the difficulty of defining membership functions, their centres, and support on a domain with arbitrary dimensionality and topology. We propose a novel method for the adaptive selection of the optimal centres and supports of a class of radial membership functions based on minimizing the reconstruction error of the input signal as the F-transform and its inverse, or as a weighted linear combination of the membership functions. Replacing uniformly sampled centres of the membership functions with adaptive centres and fixed supports with adaptive supports allows us to preserve the input signal's local and global features and achieve a good approximation accuracy with fewer membership functions. We compare our method with uniform sampling and previous work. As a result, we improve the image reconstruction with respect to compared methods and we reduce the underlying computational cost and storage overhead. Finally, our approach applies to any class of continuous membership functions.
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ISSN:1063-6706
1941-0034
DOI:10.1109/TFUZZ.2024.3360633