Prime ideals and three-generated ideals with large regularity

Abstract

Ananyan and Hochster proved the existence of a function (m,d) such that any graded ideal I generated by m forms of degree at most d in a standard graded polynomial ring satisfies reg(I) (m,d). Relatedly, Caviglia et. al. proved the existence of a function (e) such that any nondegenerate prime ideal P of degree e in a standard graded polynomial ring over an algebraically closed field satisfies reg(P) (deg(P)). We provide a construction showing that both (3,d) and (e) must be at least doubly exponential in d and e, respectively. Previously known lower bounds were merely super-polynomial in both cases.