A combinatorial algorithm for computing the entire sequence of the maximum degree of minors of a generic partitioned polynomial matrix with 2 × 2 submatrices

Abstract

In this paper, we consider the problem of computing the entire sequence of the maximum degree of minors of a block-structured symbolic matrix (a generic partitioned polynomial matrix) A = (Aαβ xα β tdα β), where Aαβ is a 2 × 2 matrix over a field F, xα β is an indeterminate, and dα β is an integer for α = 1,2,…, μ and β = 1,2,…,, and t is an additional indeterminate. This problem can be viewed as an algebraic generalization of the maximum weight bipartite matching problem. The main result of this paper is a combinatorial O(μ \μ, \2)-time algorithm for computing the entire sequence of the maximum degree of minors of a (2 × 2)-type generic partitioned polynomial matrix of size 2μ × 2. We also present a minimax theorem, which can be used as a good characterization (NP co-NP characterization) for the computation of the maximum degree of minors of order k. Our results generalize the classical primal-dual algorithm (the Hungarian method) and minimax formula (Egerv\'ary's theorem) for the maximum weight bipartite matching problem.