English

Normalized Berkovich spaces and surface singularities

Algebraic Geometry 2018-10-16 v2

Abstract

We define normalized versions of Berkovich spaces over a trivially valued field kk, obtained as quotients by the action of R>0\mathbb R_{>0} defined by rescaling semivaluations. We associate such a normalized space to any special formal kk-scheme and prove an analogue of Raynaud's theorem, characterizing categorically the spaces obtained in this way. This construction yields a locally ringed GG-topological space, which we prove to be GG-locally isomorphic to a Berkovich space over the field k((t))k((t)) with a tt-adic valuation. These spaces can be interpreted as non-archimedean models for the links of the singularities of kk-varieties, and allow to study the birational geometry of kk-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 kk is analogous to the structure of non-archimedean analytic curves over k((t))k((t)), 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.

Keywords

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

R2 v1 2026-06-22T07:32:01.723Z