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 \cite{Le89} or are specified by 1-dimensional finite narrow periodic specifications as in \cite{Wa93}. We show that, for most of the problems considered when specified using {\bf k-level-restricted} hierarchical specifications or -narrow periodic specifications the following holds: \item Let be any performance guarantee of a polynomial time approximation algorithm for , when instances are specified using standard specifications. Then , has a polynomial time approximation algorithm with performance guarantee . \item has a polynomial time approximation scheme when restricted to planar instances. \end{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. \cite{CF+93}.
Cite
@article{arxiv.cs/9809064,
title = {Approximation Algorithms for PSPACE-Hard Hierarchically and Periodically Specified Problems},
author = {Madhav V. Marathe and Harry B. Hunt and Richard E. Stearns and Venkatesh Radhakrishnan},
journal= {arXiv preprint arXiv:cs/9809064},
year = {2007}
}
Comments
5 Figures, 24 pages