Small ideals in polynomial rings and applications

Abstract

Let k be a field which is either finite or algebraically closed and let R = k[x1,…,xn]. We prove that any g1,…,gs∈ R homogeneous of positive degrees d are contained in an ideal generated by an Rt-sequence of A(d)(s+t)B(d) homogeneous polynomials of degree d, subject to some restrictions on the characteristic of k. This yields effective bounds for new cases of Ananyan and Hochster's theorem A in arXiv:1610.09268 on strength and the codimension of the singular locus. It also implies effective bounds when d equals the characteristic of k for Tao and Ziegler's result in arXiv:1101.1469 on rank and Ud Gowers norms of polynomials over finite fields.