Normalized Berkovich spaces and surface singularities
Abstract
We define normalized versions of Berkovich spaces over a trivially valued field , obtained as quotients by the action of defined by rescaling semivaluations. We associate such a normalized space to any special formal -scheme and prove an analogue of Raynaud's theorem, characterizing categorically the spaces obtained in this way. This construction yields a locally ringed -topological space, which we prove to be -locally isomorphic to a Berkovich space over the field with a -adic valuation. These spaces can be interpreted as non-archimedean models for the links of the singularities of -varieties, and allow to study the birational geometry of -varieties using techniques of non-archimedean geometry available only when working over a field with non-trivial valuation. In particular, we prove that the structure of the normalized non-archimedean links of surface singularities over an algebraically closed field is analogous to the structure of non-archimedean analytic curves over , and deduce characterizations of the essential and of the log essential valuations, i.e. those valuations whose center on every resolution (respectively log resolution) of the given surface is a divisor.
Cite
@article{arxiv.1412.4676,
title = {Normalized Berkovich spaces and surface singularities},
author = {Lorenzo Fantini},
journal= {arXiv preprint arXiv:1412.4676},
year = {2018}
}
Comments
Several corrections and improvements. New result added, Theorem 10.8, proving a characterization of essential valuations. 51 pages. To appear in Transactions of the AMS