Branching Bisimilarity of Normed BPA Processes as a Rational Monoid
Petr Jancar
TL;DR
This paper simplifies and elaborates on the structural understanding of branching bisimilarity for normed BPA processes, showing it corresponds to a rational monoid and can be decided by finite transducers, advancing theoretical foundations.
Contribution
It presents a new framework for the decomposition result, linking branching bisimilarity to rational monoids and finite transducers, with complete, accessible proofs.
Findings
Branching bisimilarity on normed BPA is a rational monoid.
Decidability of bisimilarity via normal-form deterministic finite transducers.
Provides a clear, comprehensive proof framework.
Abstract
The paper presents an elaborated and simplified version of the structural result for branching bisimilarity on normed BPA (Basic Process Algebra) processes that was the crux of a conference paper by Czerwinski and Jancar (arxiv 7/2014 and LiCS 2015). That paper focused on the computational complexity, and a NEXPTIME-upper bound has been derived; the authors built on the ideas by Fu (ICALP 2013), and strengthened his decidability result. Later He and Huang announced the EXPTIME-completeness of this problem (arxiv 1/2015, and LiCS 2015), giving a technical proof for the EXPTIME membership. He and Huang indirectly acknowledge the decomposition ideas by Czerwinski and Jancar on which they also built, but it is difficult to separate their starting point from their new ideas. One aim here is to present the previous decomposition result of Czerwinski and Jancar in a technically new framework,…
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