<--- Back to Details
First PageDocument Content
Mathematics / Algebraic geometry / Topos theory / Functors / Grothendieck topology / Sheaf / Topos / Adjoint functors / Étale morphism / Abstract algebra / Category theory / Sheaf theory
Date: 2010-05-19 14:22:12
Mathematics
Algebraic geometry
Topos theory
Functors
Grothendieck topology
Sheaf
Topos
Adjoint functors
Étale morphism
Abstract algebra
Category theory
Sheaf theory

Add to Reading List

Source URL: math.berkeley.edu

Download Document from Source Website

File Size: 1,61 MB

Share Document on Facebook

Similar Documents

Algebra / Abstract algebra / Mathematics / Homological algebra / Category theory / Algebras / Algebraic topology / Operad theory / Hochschild homology / Functor / Enriched category / Monoidal category

LEIBNIZ HOMOLOGY OF LIE ALGEBRAS AS FUNCTOR HOMOLOGY ERIC HOFFBECK AND CHRISTINE VESPA Abstract. We prove that Leibniz homology of Lie algebras can be described as functor homology in the category of linear functors from

DocID: 1xVSt - View Document

Category theory / Mathematics / Algebra / Functors / Homological algebra / Algebraic topology / Additive categories / Natural transformation / Exact functor / Yoneda lemma / Equivalence of categories / Sheaf

Algebraic & Geometric Topology–Generic representations of orthogonal groups: the mixed functors

DocID: 1xVsM - View Document

Category theory / Mathematics / Algebra / Functors / Natural transformation / Exact functor / Forgetful functor / Yoneda lemma / Equivalence of categories / Sheaf / Calculus of functors / Adjoint functors

GENERIC REPRESENTATIONS OF ORTHOGONAL GROUPS: PROJECTIVE FUNCTORS IN THE CATEGORY Fquad CHRISTINE VESPA Abstract. In this paper, we continue the study of the category of functors Fquad , associated to F2 -vector spaces e

DocID: 1xUY4 - View Document

Algebra / Mathematics / Category theory / Functors / Adjoint functors / Equivalence / Homological algebra / Sheaf / Operad theory / Natural transformation / Isomorphism of categories / Additive category

. (0000) “Polynomial functors from algebras over a set-operad and non-linear Mackey functors,” International Mathematics Research Notices, Vol. 0000, Article ID rnn000, 54 pages. doi:imrn/rnn000 Polynomial fu

DocID: 1xUrv - View Document

Mathematics / Abstract algebra / Algebra / Functors / Category theory / Homological algebra / Algebraic topology / Adjoint functors / Natural transformation / Yoneda lemma / Limit / Universal property

QUADRATIC FUNCTORS ON POINTED CATEGORIES MANFRED HARTL & CHRISTINE VESPA Abstract. We study polynomial functors of degree 2, called quadratic, with values in the category of abelian groups Ab, and whose source category i

DocID: 1xTBF - View Document