Better Quasi-Ordered Transition Systems

Many existing algorithms for model checking of infinite-state systems operate on constraints which are used to represent (potentially infinite) sets of states. A general powerful technique which can be employed for proving termination of these algorithms is that of well quasi-orderings. Several methodologies have been proposed for derivation of new well quasi-ordered constraint systems. However, many of these constraint systems suffer from a “constraint explosion problem”, as the number of the generated constraints grows exponentially with the size of the problem. In this paper, we demonstrate that a refinement of the theory of well quasi-orderings, called the theory of better quasi-orderings, is more appropriate for symbolic model checking, since it allows inventing constraint systems which are both well quasiordered and compact. As a main application, we introduce existential zones, a constraint system for verification of systems with unboundedly many clocks and use our methodology to prove that existential zones are better quasi-ordered. We show how to use existential zones in verification of timed Petri nets and present some experimental results. Also, we apply our methodology to derive new constraint systems for verification of broadcast protocols, lossy channel systems, and integral relational automata. The new constraint systems are exponentially more succinct than existing ones, and their well quasi-ordering cannot be shown by previous methods in the literature.