Parameterizing the Permanent: Hardness for $K_8$-minor-free graphs
Computational Complexity
2021-08-31 v1 Data Structures and Algorithms
Abstract
In the 1960s, statistical physicists discovered a fascinating algorithm for counting perfect matchings in planar graphs. Valiant later showed that the same problem is #P-hard for general graphs. Since then, the algorithm for planar graphs was extended to bounded-genus graphs, to graphs excluding or , and more generally, to any graph class excluding a fixed minor that can be drawn in the plane with a single crossing. This stirred up hopes that counting perfect matchings might be polynomial-time solvable for graph classes excluding any fixed minor . Alas, in this paper, we show #P-hardness for -minor-free graphs by a simple and self-contained argument.
Cite
@article{arxiv.2108.12879,
title = {Parameterizing the Permanent: Hardness for $K_8$-minor-free graphs},
author = {Radu Curticapean and Mingji Xia},
journal= {arXiv preprint arXiv:2108.12879},
year = {2021}
}
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12 pages