Approximation Algorithms for PSPACE-Hard Hierarchically and Periodically Specified Problems

Abstract

We study the efficient approximability of basic graph and logic problems in the literature when instances are specified hierarchically as in Le89 or are specified by 1-dimensional finite narrow periodic specifications as in Wa93. We show that, for most of the problems considered when specified using k-level-restricted hierarchical specifications or k-narrow periodic specifications the following holds: Let be any performance guarantee of a polynomial time approximation algorithm for , when instances are specified using standard specifications. Then ∀ ε > 0, has a polynomial time approximation algorithm with performance guarantee (1 + ε) . has a polynomial time approximation scheme when restricted to planar instances. romannum These are the first polynomial time approximation schemes for PSPACE-hard hierarchically or periodically specified problems. Since several of the problems considered are PSPACE-hard, our results provide the first examples of natural PSPACE-hard optimization problems that have polynomial time approximation schemes. This answers an open question in Condon et. al. CF+93.

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