Approximability of the Subset Sum Reconfiguration Problem

Author(s)

Ito, Takehiro; Demaine, Erik D.

Abstract

The subset sum problem is a well-known NP-complete problem in which we wish to find a packing (subset) of items (integers) into a knapsack with capacity so that the sum of the integers in the packing is at most the capacity of the knapsack and at least a given integer threshold. In this paper, we study the problem of reconfiguring one packing into another packing by moving only one item at a time, while at all times maintaining the feasibility of packings. First we show that this decision problem is strongly NP-hard, and is PSPACE-complete if we are given a conflict graph for the set of items in which each vertex corresponds to an item and each edge represents a pair of items that are not allowed to be packed together into the knapsack. We then study an optimization version of the problem: we wish to maximize the minimum sum among all packings in the reconfiguration. We show that this maximization problem admits a polynomial-time approximation scheme (PTAS), while the problem is APX-hard if we are given a conflict graph.

Date issued

2011-05

URI

http://hdl.handle.net/1721.1/86057

Department

Massachusetts Institute of Technology. Computer Science and Artificial Intelligence Laboratory
Massachusetts Institute of Technology. Department of Electrical Engineering and Computer Science

Journal

Theory and Applications of Models of Computation

Publisher

Springer-Verlag

Citation

Ito, Takehiro, and Erik D. Demaine. “Approximability of the Subset Sum Reconfiguration Problem.” Lecture Notes in Computer Science (2011): 58–69.

Version: Author's final manuscript

ISBN

978-3-642-20876-8

978-3-642-20877-5

ISSN

0302-9743

1611-3349