Properties of analogues of Frobenius powers of ideals

Abstract

Let R=K[X1, … , Xn ] be a polynomial ring over a field K. We introduce an endomorphism F[m]: R → R and denote the image of an ideal I of R via this endomorphism as I[m] and call it to be the m -th square power of I. In this article, we study some homological invariants of I[m] such as regularity, projective dimension, associated primes and depth for some families of ideals e.g. monomial ideals.