Branching Place Bisimilarity

Abstract

Place bisimilarity is a behavioral equivalence for finite Petri nets, proposed in ABS91 and proved decidable in Gor21. In this paper we propose an extension to finite Petri nets with silent moves of the place bisimulation idea, yielding branching place bisimilarity ≈p, following the intuition of branching bisimilarity vGW96 on labeled transition systems. We also propose a slightly coarser variant, called branching d-place bisimilarity ≈d, following the intuition of d-place bisimilarity in Gor21. We prove that ≈p and ≈d are decidable equivalence relations. Moreover, we prove that ≈d is strictly finer than branching fully-concurrent bisimilarity Pin93,Gor20c, essentially because ≈d does not consider as unobservable those τ-labeled net transitions with pre-set size larger than one, i.e., those resulting from (multi-party) interaction.