Nonarchimedean bivariant K-theory

Abstract

We introduce bivariant K-theory for nonarchimedean bornological algebras over a complete discrete valuation ring V. This is the universal target for dagger homotopy invariant, matricially stable and excisive functors, similar to bivariant K-theory for locally convex topological C-algebras and algebraic bivariant K-theory. When the first variable is the ground algebra V, we get a version of Weibel's homotopy algebraic K-theory, which we call stabilised overconvergent analytic K-theory. The resulting analytic K-theory satisfies dagger homotopy invariance, stability by completed matrix algebras, and excision.

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