The Theory of regions is an approach for synthesizing a Petri net from a transition system. As such, it aims at recovering concurrent, independent behavior from transitions between global states. Theory of regions handles elementary net systems as well as P/T nets and other kinds of nets. An important point is that the approach is aimed at the synthesis of unlabeled Petri nets only.
A region of a transition system is a mapping assigning to each state
a number
(natural number for P/T nets, binary for ENS) and to each transition label a number
such that consistency conditions
holds whenever
.[1]
Each region represents a potential place of a Petri net.
Mukund: event/state separation property, state separation property.[2]