On Golod Subdeterminantal Ideals

Abstract

Let X=(xij)m× n be a matrix of indeterminates and let S=k[xij 1≤ i≤ m,\ 1≤ j≤ n] be a polynomial ring over an infinite field k. Let I be an ideal generated by a subset of the set of all 2×2 minors of X. We show that the quotient ring S/I is Golod if and only if I=I2(Y) for some 2× or ×2 submatrix Y of X. In fact, we prove that Golodness of S/I is equivalent to the triviality of the product on the Koszul homology of S/I and to I having a linear resolution. Along the way, we also prove a result on the non-Golodness of tensor products of rings under certain conditions.