On the arithmetic complexity of computing Gr\"obner bases of comaximal determinantal ideals

Abstract

Let M be an n× n matrix of homogeneous linear forms over a field . If the ideal In-2(M) generated by minors of size n-1 is Cohen-Macaulay, then the Gulliksen-Negrd complex is a free resolution of In-2(M). It has recently been shown that by taking into account the syzygy modules for In-2(M) which can be obtained from this complex, one can derive a refined signature-based Gr\"obner basis algorithm DetGB which avoids reductions to zero when computing a grevlex Gr\"obner basis for In-2(M). In this paper, we establish sharp complexity bounds on DetGB. To accomplish this, we prove several results on the sizes of reduced grevlex Gr\"obner bases of reverse lexicographic ideals, thanks to which we obtain two main complexity results which rely on conjectures similar to that of Fr\"oberg. The first one states that, in the zero-dimensional case, the size of the reduced grevlex Gr\"obner basis of In-2(M) is bounded from below by n6 asymptotically. The second, also in the zero-dimensional case, states that the complexity of DetGB is bounded from above by n2ω+3 asymptotically, where 2ω 3 is any complexity exponent for matrix multiplication over .