A complete dichotomy for complex-valued Holant^c
Abstract
Holant problems are a family of counting problems on graphs, parametrised by sets of complex-valued functions of Boolean inputs. Holant^c denotes a subfamily of those problems, where any function set considered must contain the two unary functions pinning inputs to values 0 or 1. The complexity classification of Holant problems usually takes the form of dichotomy theorems, showing that for any set of functions in the family, the problem is either #P-hard or it can be solved in polynomial time. Previous such results include a dichotomy for real-valued Holant^c and one for Holant^c with complex symmetric functions. Here, we derive a dichotomy theorem for Holant^c with complex-valued, not necessarily symmetric functions. The tractable cases are the complex-valued generalisations of the tractable cases of the real-valued Holant^c dichotomy. The proof uses results from quantum information theory, particularly about entanglement.
Cite
@article{arxiv.1704.05798,
title = {A complete dichotomy for complex-valued Holant^c},
author = {Miriam Backens},
journal= {arXiv preprint arXiv:1704.05798},
year = {2018}
}
Comments
18 pages; v2 fixes statement of main theorem and one of the lemmas