Non-archimedean tame topology and stably dominated types

Abstract

Let V be a quasi-projective algebraic variety over a non-archimedean valued field. We introduce topological methods into the model theory of valued fields, define an analogue V of the Berkovich analytification Van of V, and deduce several new results on Berkovich spaces from it. In particular we show that Van retracts to a finite simplicial complex and is locally contractible, without any smoothness assumption on V. When V varies in an algebraic family, we show that the homotopy type of Van takes only a finite number of values. The space V is obtained by defining a topology on the pro-definable set of stably dominated types on V. The key result is the construction of a pro-definable strong retraction of V to an o-minimal subspace, the skeleton, definably homeomorphic to a space definable over the value group with its piecewise linear structure.