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Bibliographic Details
Main Author: Dahlhausen, Christian
Format: Preprint
Published: 2019
Subjects:
Online Access:https://arxiv.org/abs/1910.10437
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author Dahlhausen, Christian
author_facet Dahlhausen, Christian
contents We establish a connection between continuous K-theory and integral cohomology of rigid spaces. Given a rigid analytic space over a complete discretely valued field, its continuous K-groups vanish in degrees below the negative of the dimension. Likewise, the cohomology groups vanish in degrees above the dimension. The main result provides the existence of an isomorphism between the lowest possibly non-vanishing continuous K-group and the highest possibly non-vanishing cohomology group with integral coefficients. A key role in the proof is played by a comparison between cohomology groups of an admissible Zariski-Riemann space with respect to different topologies; namely, the rh-topology which is related to K-theory as well as the Zariski topology whereon the cohomology groups in question rely.
format Preprint
id arxiv_https___arxiv_org_abs_1910_10437
institution arXiv
publishDate 2019
record_format arxiv
spellingShingle Continuous K-Theory and Cohomology of Rigid Spaces
Dahlhausen, Christian
K-Theory and Homology
Algebraic Geometry
We establish a connection between continuous K-theory and integral cohomology of rigid spaces. Given a rigid analytic space over a complete discretely valued field, its continuous K-groups vanish in degrees below the negative of the dimension. Likewise, the cohomology groups vanish in degrees above the dimension. The main result provides the existence of an isomorphism between the lowest possibly non-vanishing continuous K-group and the highest possibly non-vanishing cohomology group with integral coefficients. A key role in the proof is played by a comparison between cohomology groups of an admissible Zariski-Riemann space with respect to different topologies; namely, the rh-topology which is related to K-theory as well as the Zariski topology whereon the cohomology groups in question rely.
title Continuous K-Theory and Cohomology of Rigid Spaces
topic K-Theory and Homology
Algebraic Geometry
url https://arxiv.org/abs/1910.10437