Asymptotic Lech's inequality

Abstract

We explore the classical Lech's inequality relating the Hilbert--Samuel multiplicity and colength of an m-primary ideal in a Noetherian local ring (R,m). We prove optimal versions of Lech's inequality for sufficiently deep ideals in characteristic p>0, and we conjecture that they hold in all characteristics. Our main technical result shows that if (R,m) has characteristic p>0 and R is reduced, equidimensional, and has an isolated singularity, then for any sufficiently deep m-primary ideal I, the colength and Hilbert--Kunz multiplicity of I are sufficiently close to each other. More precisely, for all >0, there exists N0 such that for any I⊂eq R with l(R/I)>N, we have (1-)l(R/I)≤ eHK(I)≤(1+)l(R/I).