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Main Author: Borisov, Alexander
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2605.05515
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author Borisov, Alexander
author_facet Borisov, Alexander
contents Kirch topology on $\mathbb N$ goes back to 1969, and is remarkable for being Hausdorff, connected, and locally connected. In this sense, it is analogous to the usual topology on $\mathbb C,$ yet, to the author's knowledge, there have been no Kirch topology analogs of the sheaf of complex-analytic functions until very recently. In our latest paper we constructed such natural sheaf of rings, the sheaf of locally LIP functions. In this paper we investigate some of its basic properties, primarily regarding zeroth and first cohomology and Cech cohomology with respect to covers by basic open sets.
format Preprint
id arxiv_https___arxiv_org_abs_2605_05515
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle A Structure Sheaf for Kirch Topology
Borisov, Alexander
Number Theory
Algebraic Geometry
11B05, 11B25, 11C08, 11D04, 11G99, 14G99, 55N30
Kirch topology on $\mathbb N$ goes back to 1969, and is remarkable for being Hausdorff, connected, and locally connected. In this sense, it is analogous to the usual topology on $\mathbb C,$ yet, to the author's knowledge, there have been no Kirch topology analogs of the sheaf of complex-analytic functions until very recently. In our latest paper we constructed such natural sheaf of rings, the sheaf of locally LIP functions. In this paper we investigate some of its basic properties, primarily regarding zeroth and first cohomology and Cech cohomology with respect to covers by basic open sets.
title A Structure Sheaf for Kirch Topology
topic Number Theory
Algebraic Geometry
11B05, 11B25, 11C08, 11D04, 11G99, 14G99, 55N30
url https://arxiv.org/abs/2605.05515