Model Repair via Symmetry

Abstract

The symmetry of a Kripke structure M has been exploited to replace a model check of M by a model check of the potentially smaller structure N obtained as the quotient of M by its symmetry group G. We extend previous work to model repair: identify a substructure that satisfies a given temporal logic formula. We show that the substructures of M that are preserved by G form a lattice that maps to the substructure lattice of N. We also show the existence of a monotone Galois connection between the lattice of substructures of N and the lattice of substructures of M that are "maximal" w.r.t. an appropriately defined group action of G on M. These results enable us to repair N and then to lift the repair to M. We can thus repair symmetric finite-state concurrent programs by repairing the corresponding N, thereby effecting program repair while avoiding state-explosion.