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1. Verfasser: Nguyen, Linh Anh
Format: Preprint
Veröffentlicht: 2024
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Online-Zugang:https://arxiv.org/abs/2407.01052
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author Nguyen, Linh Anh
author_facet Nguyen, Linh Anh
contents Fuzzy transition systems offer a robust framework for modeling and analyzing systems with inherent uncertainties and imprecision, which are prevalent in real-world scenarios. As their extension, nondeterministic fuzzy transition systems (NFTSs) have been studied in a considerable number of works. Wu et al. (2018) provided an algorithm for computing the greatest crisp bisimulation of a finite NFTS $\mathcal{S} = \langle S, A, δ\rangle$, with a time complexity of order $O(|S|^4 \cdot |δ|^2)$ under the assumption that $|δ| \geq |S|$. Qiao {\em et al.} (2023) provided an algorithm for computing the greatest fuzzy bisimulation of a finite NFTS $\mathcal{S}$ under the Gödel semantics, with a time complexity of order $O(|S|^4 \cdot |δ|^2 \cdot l)$ under the assumption that $|δ| \geq |S|$, where $l$ is the number of fuzzy values used in $\mathcal{S}$ plus 1. In this work, we provide efficient algorithms for computing the partition corresponding to the greatest crisp bisimulation of a finite NFTS $\mathcal{S}$, as well as the compact fuzzy partition corresponding to the greatest fuzzy bisimulation of $\mathcal{S}$ under the Gödel semantics. Their time complexities are of the order $O((size(δ) \log{l} + |S|) \log{(|S| + |δ|)})$, where $l$ is the number of fuzzy values used in $\mathcal{S}$ plus 2. When $|δ| \geq |S|$, this order is within $O(|S| \cdot |δ| \cdot \log^2{|δ|})$. The reduction of time complexity from $O(|S|^4 \cdot |δ|^2)$ and $O(|S|^4 \cdot |δ|^2 \cdot l)$ to $O(|S| \cdot |δ| \cdot \log^2{|δ|})$ is a significant contribution of this work. In addition, we introduce nondeterministic fuzzy labeled transition systems, which extend NFTSs with fuzzy state labels, and we define and provide results on simulations and bisimulations between them.
format Preprint
id arxiv_https___arxiv_org_abs_2407_01052
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Efficient algorithms for computing bisimulations for nondeterministic fuzzy transition systems
Nguyen, Linh Anh
Data Structures and Algorithms
Fuzzy transition systems offer a robust framework for modeling and analyzing systems with inherent uncertainties and imprecision, which are prevalent in real-world scenarios. As their extension, nondeterministic fuzzy transition systems (NFTSs) have been studied in a considerable number of works. Wu et al. (2018) provided an algorithm for computing the greatest crisp bisimulation of a finite NFTS $\mathcal{S} = \langle S, A, δ\rangle$, with a time complexity of order $O(|S|^4 \cdot |δ|^2)$ under the assumption that $|δ| \geq |S|$. Qiao {\em et al.} (2023) provided an algorithm for computing the greatest fuzzy bisimulation of a finite NFTS $\mathcal{S}$ under the Gödel semantics, with a time complexity of order $O(|S|^4 \cdot |δ|^2 \cdot l)$ under the assumption that $|δ| \geq |S|$, where $l$ is the number of fuzzy values used in $\mathcal{S}$ plus 1. In this work, we provide efficient algorithms for computing the partition corresponding to the greatest crisp bisimulation of a finite NFTS $\mathcal{S}$, as well as the compact fuzzy partition corresponding to the greatest fuzzy bisimulation of $\mathcal{S}$ under the Gödel semantics. Their time complexities are of the order $O((size(δ) \log{l} + |S|) \log{(|S| + |δ|)})$, where $l$ is the number of fuzzy values used in $\mathcal{S}$ plus 2. When $|δ| \geq |S|$, this order is within $O(|S| \cdot |δ| \cdot \log^2{|δ|})$. The reduction of time complexity from $O(|S|^4 \cdot |δ|^2)$ and $O(|S|^4 \cdot |δ|^2 \cdot l)$ to $O(|S| \cdot |δ| \cdot \log^2{|δ|})$ is a significant contribution of this work. In addition, we introduce nondeterministic fuzzy labeled transition systems, which extend NFTSs with fuzzy state labels, and we define and provide results on simulations and bisimulations between them.
title Efficient algorithms for computing bisimulations for nondeterministic fuzzy transition systems
topic Data Structures and Algorithms
url https://arxiv.org/abs/2407.01052