Uniform Approximation of Abhyankar Valuation Ideals in Smooth Function Fields
Abstract
In this paper we use the theory of multiplier ideals to show that the valuation ideals of a rank one Abhyankar valuation centered at a smooth point of a complex algebraic variety are approximated, in a quite strong sense, by sequences of powers of fixed ideals. Fix a rank one valuation v centered at a smooth point x on an algebraic variety over a field of characteristic zero. Assume that v is Abhyankar, that is, that its rational rank plus its transcendence degree equal the dimension of the variety. Let a_m denote the ideal of elements in the local ring of x whose valuations are at least m. Our main theorem is that there exists e>0 such that a_{mn} is contained in (a_{m-e})^n for all m and n. This can be viewed as a greatly strengthened form of Izumi's Theorem for Abhyankar valuations centered on smooth complex varieties.
Keywords
Cite
@article{arxiv.math/0202303,
title = {Uniform Approximation of Abhyankar Valuation Ideals in Smooth Function Fields},
author = {Lawrence Ein and Robert Lazarsfeld and Karen E. Smith},
journal= {arXiv preprint arXiv:math/0202303},
year = {2007}
}
Comments
27 pages, latex