Upper bounds for regularity of radicals of ideals and arithmetic degrees

Abstract

Let S be a polynomial ring in n variables over a field. Let I be a homogeneous ideal in S generated by forms of degree at most d with dim(S/I)=r. In the first part of this paper, we show how to derive from a result of Hoa an upper bound for the regularity of I. More specifically we show that reg(I)≤ d(n-1)2r-1. In the second part, we show that the r-th arithmetic degree of I is bounded above by 2· d2n-r-1. This is done by proving upper bounds for arithmetic degrees of strongly stable ideals and ideals of Borel type.