On the Complexity of Noncommutative Polynomial Factorization
Abstract
In this paper we study the complexity of factorization of polynomials in the free noncommutative ring of polynomials over the field and noncommuting variables . Our main results are the following. Although is not a unique factorization ring, we note that variable-disjoint factorization in has the uniqueness property. Furthermore, we prove that computing the variable-disjoint factorization is polynomial-time equivalent to Polynomial Identity Testing (both when the input polynomial is given by an arithmetic circuit or an algebraic branching program). We also show that variable-disjoint factorization in the black-box setting can be efficiently computed (where the factors computed will be also given by black-boxes, analogous to the work [KT91] in the commutative setting). As a consequence of the previous result we show that homogeneous noncommutative polynomials and multilinear noncommutative polynomials have unique factorizations in the usual sense, which can be efficiently computed. Finally, we discuss a polynomial decomposition problem in which is a natural generalization of homogeneous polynomial factorization and prove some complexity bounds for it.
Keywords
Cite
@article{arxiv.1501.00671,
title = {On the Complexity of Noncommutative Polynomial Factorization},
author = {V. Arvind and Pushkar S Joglekar and Gaurav Rattan},
journal= {arXiv preprint arXiv:1501.00671},
year = {2015}
}