Executions in (Semi-)Integer Petri Nets are Compact Closed Categories
Category Theory
2019-01-30 v3 Distributed, Parallel, and Cluster Computing
Abstract
In this work, we analyse Petri nets where places are allowed to have a negative number of tokens. For each net we build its correspondent category of executions, which is compact closed, and prove that this procedure is functorial. We moreover exhibit a procedure to recover the original net from its category of executions, show that it is again functorial, and that this gives rise to an adjoint pair. Finally, we use compact closeness to infer that allowing negative tokens in a Petri net makes the causal relations between transition firings non-trivial, and we use this to model interesting phenomena in economics and computer science.
Cite
@article{arxiv.1805.05988,
title = {Executions in (Semi-)Integer Petri Nets are Compact Closed Categories},
author = {Fabrizio Genovese and Jelle Herold},
journal= {arXiv preprint arXiv:1805.05988},
year = {2019}
}
Comments
In Proceedings QPL 2018, arXiv:1901.09476