Local Computing By Partial Quantifier Elimination

Localization of computations plays a crucial role in solving hard problems efficiently. We will refer to the techniques implementing such localization as ${\mathit local}$ ${\mathit computing}$. We relate local computing with $\mathit{partial}$ $\mathit{quantifier}$ $\mathit{elimination}$ (PQE). The latter is a generalization of regular quantifier elimination where one can take a $\mathit{part}$ of the formula out of the scope of quantifiers. The objective of this paper is to show that PQE can be viewed as a language of local computing and hence building efficient PQE solvers is of great importance. We describe application of local computing by PQE to three different problems of hardware verification: property generation, equivalence checking and model checking. Besides, we discuss using local computing by PQE for SAT solving. Finally, we relate PQE and interpolation, a form of local computing.