Abstract
Since the seminal paper by Bloom, Fokkink and van Glabbeek, the Divide and Congruence technique allows for the derivation of compositional properties of nondeterministic processes from the SOS-based decomposition of their modal properties. In an earlier paper, we extended their technique to deal also with quantitative aspects of process behavior: we proved the (pre)congruence property for strong (bi)simulations on processes with nondeterminism and probability. In this paper we further extend our decomposition method to favor compositional reasoning with respect to probabilistic weak semantics. In detail, we consider probabilistic branching and rooted probabilistic branching bisimilarity, and we propose logical characterizations for them. These are strongly based on the modal operator 〈ε〉 which combines quantitative information and weak semantics by introducing a sort of probabilistic lookahead on process behavior. Our enhanced method will exploit distribution specifications, an SOS-like framework defining the probabilistic behavior of processes, to decompose this particular form of lookahead. We will show how we can apply the proposed decomposition method to derive congruence formats for the considered equivalences from their logical characterizations.
Original language | English |
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Pages (from-to) | 147-196 |
Number of pages | 50 |
Journal | Theoretical Computer Science |
Volume | 802 |
DOIs | |
Publication status | Published - 8 Jan 2020 |
Bibliographical note
Funding Information:This author is partially supported by the project ?Open Problems in the Equational Logic of Processes? (OPEL) of the Icelandic Research Fund (grant No. 196050-051).
Publisher Copyright:
© 2019 Elsevier B.V.
Other keywords
- Congruence formats
- Modal decomposition
- Nondeterministic probabilistic transition systems
- Probabilistic branching bisimulation
- SOS