Abstract
We investigate gcf-Petri nets, a generalization of communication-free Petri nets allowing arbitrary arc multiplicities, and characterized by the sole restriction that each transition has at most one incoming arc. We use canonical firing sequences with nice properties for gcf-PNs to show that the RecLFS, (zero-)reachability, covering, and boundedness problems of gcf-PNs are in PSPACE. By simulating PSPACE-Turing machines by gss-PNs, a subclass of gcf-PNs where additionally all transitions have at most one outgoing arc, we ultimately obtain PSPACE-completess for these problems in case of gss-PNs or gcf-PNs. Additionally, we prove PSPACE-completeness for the liveness problem of gcf-PNs. Last, we show PSPACE-hardness as well as a doubly exponential space upper bound for the containment and equivalence problems of gss-PNs or gcf-PNs.
| Original language | English |
|---|---|
| Pages (from-to) | 355-391 |
| Number of pages | 37 |
| Journal | Fundamenta Informaticae |
| Volume | 143 |
| Issue number | 3-4 |
| DOIs | |
| State | Published - 4 Mar 2016 |
Keywords
- Generalized communication-freePetri nets
- arbitrary arc multiplicities
- arbitrary edge multiplicities
- boundedness
- containment
- covering
- equivalence
- general Petri nets
- general arc multiplicities
- general edge multiplicities
- generalized Petri nets
- generalized S-systems
- join-free Petri nets
- liveness
- reachability
- weighted state machines