Abstract / Description of output
We show a cancellation property for probabilistic choice. If distributions mu + rho and nu + rho are branching probabilistic bisimilar, then distributions mu and nu are also branching probabilistic bisimilar. We do this in the setting of a basic process language involving non-deterministic and probabilistic choice and define branching probabilistic bisimilarity on distributions. Despite the fact that the cancellation property is very elegant and concise, we failed to provide a short and natural combinatorial proof. Instead we provide a proof using metric topology. Our major lemma is that every distribution can be unfolded into an equivalent stable distribution, where the topological arguments are required to deal with uncountable branching.
| Original language | English |
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| Title of host publication | Proceedings Combined 30th International Workshop on Expressiveness in Concurrency and 20th Workshop on Structural Operational Semantics (EXPRESS/SOS2023) |
| Editors | Claudio Antares Mezzina, Georgiana Caltais |
| Publisher | Open Publishing Association |
| Pages | 42-58 |
| Number of pages | 17 |
| Volume | 387 |
| DOIs | |
| Publication status | Published - 14 Sept 2023 |
| Event | Combined 30th International Workshop on Expressiveness in Concurrency and 20th Workshop on Structural Operational Semantics - Antwerp, Belgium Duration: 18 Sept 2023 → … https://express-sos.github.io/ |
Publication series
| Name | Electronic Proceedings in Theoretical Computer Science |
|---|---|
| Publisher | Open Publishing Association |
| ISSN (Electronic) | 2075-2180 |
Conference
| Conference | Combined 30th International Workshop on Expressiveness in Concurrency and 20th Workshop on Structural Operational Semantics |
|---|---|
| Abbreviated title | EXPRESS/SOS 2023 |
| Country/Territory | Belgium |
| City | Antwerp |
| Period | 18/09/23 → … |
| Internet address |