On Matrices over a Polynomial Ring with Restricted Subdeterminants

Abstract

This paper introduces a framework to study discrete optimization problems which are parametric in the following sense: their constraint matrices correspond to matrices over the ring Z[x] of polynomials in one variable. We investigate in particular matrices whose subdeterminants all lie in a fixed set S⊂eqZ[x]. Such matrices, which we call totally S-modular matrices, are closed with respect to taking submatrices, so it is natural to look at minimally non-totally S-modular matrices which we call forbidden minors for S. Among other results, we prove that if S is finite, then the set of all determinants attained by a forbidden minor for S is also finite. Specializing to the integers, we subsequently obtain the following positive complexity result: the recognition problem for totally \0,1,a,a+1,2a+1\-modular matrices with a∈Z\-3,-2,1,2\ and the integer linear optimization problem for totally \ 0,a,a+1,2a+1\-modular matrices with a∈Z\ -2,1\ can be solved in polynomial time.

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