<--- Back to Details
First PageDocument Content
Category theory / Sheaf theory / Scheme theory / Flat topology / Fibred category / Flat morphism / Étale morphism / Stack / Topos theory / Abstract algebra / Algebra / Algebraic geometry
Date: 2012-09-20 09:46:11
Category theory
Sheaf theory
Scheme theory
Flat topology
Fibred category
Flat morphism
Étale morphism
Stack
Topos theory
Abstract algebra
Algebra
Algebraic geometry

Add to Reading List

Source URL: perso.univ-rennes1.fr

Download Document from Source Website

File Size: 290,20 KB

Share Document on Facebook

Similar Documents

Sheaf models of type theory Thierry Coquand Oxford, 8 September 2017 Sheaf models of type theory

DocID: 1tKf4 - View Document

Algebra / Abstract algebra / Mathematics / Group theory / Divisor / Morphism of schemes / Vector bundle / Sheaf / Order / Algebraic geometry / Isomorphism theorem

CANONICAL SUBGROUPS VIA BREUIL-KISIN MODULES SHIN HATTORI Abstract. Let p > 2 be a rational prime and K/Qp be an extension of complete discrete valuation fields. Let G be a truncated BarsottiTate group of level n, heigh

DocID: 1rtVq - View Document

Mathematics / Mathematical analysis / Algebra / Algebraic topology / Sheaf / Model theory / Measure theory / Functional analysis / Representation theory / Morphism of algebraic varieties / Lifting theory

217 Documenta Math. Stable Maps of Curves Robert F. Coleman

DocID: 1rrCk - View Document

Algebra / Abstract algebra / Mathematics / Algebraic geometry / Coherent sheaf / Equivariant K-theory / K-theory / Toric variety / Equivariant sheaf / Cohomology / Vector bundle / Sheaf

357 Documenta Math. Operational K -Theory Dave Anderson and Sam Payne

DocID: 1rrcl - View Document

Mathematics / Algebra / Topology / Homotopy theory / Category theory / Algebraic topology / Differential topology / Sheaf theory / Pullback / Fibration / Cartesian closed category / Product

Internal Completeness of Categories of Domains Paul Taylor 1985 This paper was presented at Category Theory and Computer Programming bf 1, University of Surrey (Guildford), SeptemberIt was published in Springer-Ve

DocID: 1rqwq - View Document