Using statically computed invariants inside the predicate abstraction and refinement loop

Predicate abstraction is a powerful technique for extracting finite-state models from often complex source code. This paper reports on the usage of statically computed invariants inside the predicate abstraction and refinement loop. The main idea is to selectively strengthen (conjoin) the concrete transition relation at a given program location by efficiently computed invariants that hold at that program location. We experimentally demonstrate the usefulness of transition relation strengthening in the predicate abstraction and refinement loop. We use invariants of the form ±x±y < c where c is a constant and x,y are program variables. These invariants can be discovered efficiently at each program location using the octagon abstract domain. We observe that the abstract models produced by predicate abstraction of strengthened transition relation are more precise leading to fewer spurious counterexamples, thus, decreasing the total number of abstraction refinement iterations. Furthermore, the length of relevant fragments of spurious traces needing refinement shortens. This leads to an addition of fewer predicates for refinement. We found a consistent reduction in the total number of predicates, maximum number of predicates tracked at a given program location, and the overall verification time.