Bipartite 3-Regular Counting Problems with Mixed Signs
Abstract
We prove a complexity dichotomy for a class of counting problems expressible as bipartite 3-regular Holant problems. For every problem of the form , where is any integer-valued ternary symmetric constraint function on Boolean variables, we prove that it is either P-time computable or #P-hard, depending on an explicit criterion of . The constraint function can take both positive and negative values, allowing for cancellations. The dichotomy extends easily to rational valued functions of the same type. In addition, we discover a new phenomenon: there is a set with the property that for every the problem is planar P-time computable but #P-hard in general, yet its planar tractability is by a combination of a holographic transformation by to FKT together with an independent global argument.
Cite
@article{arxiv.2110.01173,
title = {Bipartite 3-Regular Counting Problems with Mixed Signs},
author = {Jin-Yi Cai and Austen Z. Fan and Yin Liu},
journal= {arXiv preprint arXiv:2110.01173},
year = {2021}
}
Comments
Accepted by FCT 2021