Descent (mathematics)
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- VANISHING THEOREMS for the NEGATIVE K-THEORY of STACKS Contents 1. Introduction 1 1A. Vanishing of Negative K-Theory of Stacks 2
- Life and Work of Alexander Grothendieck
- Sets and Descent
- Why Study Algebras Over Functors? Algebras, Monads, and the Proof of Beck's Monadicity Theorem
- Fibered Categories `Ala Jean B´Enabou
- Alexandre Grothendieck 1928–2014, Part 1 Michael Artin, Allyn Jackson, David Mumford, and John Tate, Coordinating Editors
- Alexander Grothendieck Kyle Aguilar
- The Grothendieck Festschrift Volume I
- Arxiv:1507.06490V3 [Math.AG] 21 Feb 2017 of 1.1
- Arxiv:1902.01225V8 [Math.CT]
- Toric Varieties, Monoid Schemes and Cdh Descent Guillermo Cortiñas Universidad De Buenos Aires, [email protected]
- Descent for Non-Archimedean Analytic Spaces
- Fpqc Descent and Grothendieck Topologies in a Differential Setting
- Anabelian Geometryand Descent Obstructions on Moduli Spaces
- FIBERED CATEGORIES and STACKS These Notes Follow These
- AN INTRODUCTORY LECTURE on WC-GROUPS 1. the Two Definitions of a WC-Group Let K Be a Field 1 and Let a Be an Abelian Variety
- Lecture 5. Comparison Theorems for Higher K-Theory: Reduction by Reso- Lution, Additivity, Devissage. Towards Some Applications
- Arxiv:1910.11620V3 [Math.AT]