Inapproximability of a Pair of Forms Defining a Partial Boolean Function
Machine Learning
2022-09-09 v4 Computational Complexity
Discrete Mathematics
Optimization and Control
Abstract
We consider the problem of jointly minimizing forms of two Boolean functions such that and so as to separate disjoint sets such that and . We hypothesize that this problem is easier to solve or approximate than the well-understood problem of minimizing the form of one Boolean function such that and . For a large class of forms, including binary decision trees and ordered binary decision diagrams, we refute this hypothesis. For disjunctive normal forms, we show that the problem is at least as hard as MIN-SET-COVER. For all these forms, we establish that no -approximation algorithm exists unless PNP.
Cite
@article{arxiv.2102.04703,
title = {Inapproximability of a Pair of Forms Defining a Partial Boolean Function},
author = {David Stein and Bjoern Andres},
journal= {arXiv preprint arXiv:2102.04703},
year = {2022}
}