Short Presburger arithmetic is hard
Combinatorics
2017-10-23 v3 Computational Complexity
Logic in Computer Science
Logic
Abstract
We study the computational complexity of short sentences in Presburger arithmetic (Short-PA). Here by "short" we mean sentences with a bounded number of variables, quantifiers, inequalities and Boolean operations; the input consists only of the integer coefficients involved in the linear inequalities. We prove that satisfiability of Short-PA sentences with alternating quantifiers is -complete or -complete, when the first quantifier is or , respectively. Counting versions and restricted systems are also analyzed. Further application are given to hardness of two natural problems in Integer Optimizations.
Keywords
Cite
@article{arxiv.1708.08179,
title = {Short Presburger arithmetic is hard},
author = {Danny Nguyen and Igor Pak},
journal= {arXiv preprint arXiv:1708.08179},
year = {2017}
}