Refined F5 Algorithms for Ideals of Minors of Square Matrices

Abstract

We consider the problem of computing a grevlex Gr\"obner basis for the set Fr(M) of minors of size r of an n× n matrix M of generic linear forms over a field of characteristic zero or large enough. Such sets are not regular sequences; in fact, the ideal Fr(M) cannot be generated by a regular sequence. As such, when using the general-purpose algorithm F5 to find the sought Gr\"obner basis, some computing time is wasted on reductions to zero. We use known results about the first syzygy module of Fr(M) to refine the F5 algorithm in order to detect more reductions to zero. In practice, our approach avoids a significant number of reductions to zero. In particular, in the case r=n-2, we prove that our new algorithm avoids all reductions to zero, and we provide a corresponding complexity analysis which improves upon the previously known estimates.