Affiliation:
1. Università degli Studi dell'Insubria, Via Valleggio n. 11, 22100 Como, Italy
Abstract
We demonstrate that categories of continuous actions of topological monoids on discrete spaces are Grothendieck toposes. We exhibit properties of these toposes, giving a solution to the corresponding Morita-equivalence problem. We characterize these toposes in terms of their canonical points. We identify natural classes of representatives with good topological properties, 'powder monoids' and then 'complete monoids', for the Morita-equivalence classes of topological monoids. Finally, we show that the construction of these toposes can be made (2-)functorial by considering geometric morphisms induced by continuous semigroup homomorphisms.
Reference20 articles.
1. M. Barr and C. Wells. Toposes, Triples and Theories. Springer New York, NY, 1985.
2. P. Bridge. Essentially Algebraic Theories and Localizations in Toposes and Abelian Categories. PhD thesis, University of Manchester, 2012.
3. O. Caramello. Site Characterizations for Geometric Invariants of Toposes. Theory and Applications of Categories, 26, 2012.
4. O. Caramello. Topological Galois Theory. Advances in Mathematics, 291, 2016. https://doi.org/10.1016/j.aim.2015.11.050.
5. O. Caramello and L. Lafforgue. Some Aspects of Topological Galois Theory. Journal of Geometry and Physics, 142, 2019. https://doi.org/10.1016/j.geomphys.2019.04.004.
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