Wißmann T, Dorsch U, Milius S, Schröder L (2020)
Publication Language: English
Publication Type: Journal article, Original article
Publication year: 2020
Book Volume: 16
Pages Range: 1–63
Article Number: 8
Journal Issue: 1
Open Access Link: https://lmcs.episciences.org/6064
We present a generic partition refinement algorithm that quotients coalgebraic systems by behavioural equivalence, an important task in system analysis and verification. Coalgebraic generality allows us to cover not only classical relational systems but also, e.g. various forms of weighted systems and furthermore to flexibly combine existing system types. Under assumptions on the type functor that allow representing its finite coalgebras in terms of nodes and edges, our algorithm runs in time O(m⋅logn)" role="presentation">(𝑚⋅log𝑛) where n" role="presentation">𝑛 and m" role="presentation">𝑚 are the numbers of nodes and edges, respectively. The generic complexity result and the possibility of combining system types yields a toolbox for efficient partition refinement algorithms. Instances of our generic algorithm match the run-time of the best known algorithms for unlabelled transition systems, Markov chains, deterministic automata (with fixed alphabets), Segala systems, and for color refinement.
APA:
Wißmann, T., Dorsch, U., Milius, S., & Schröder, L. (2020). Efficient and Modular Coalgebraic Partition Refinement. Logical Methods in Computer Science, 16(1), 1–63.
MLA:
Wißmann, Thorsten, et al. "Efficient and Modular Coalgebraic Partition Refinement." Logical Methods in Computer Science 16.1 (2020): 1–63.
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