Jonathan Block scite author profile

Abstract. This is the second in a series of papers intended to set up a framework to study categories of modules in the context of non-commutative geometries. In [3] we introduced the basic DG category P A • , the perfect category of A• , which corresponded to the category of coherent sheaves on a complex manifold. In this paper we enlarge this category to include objects which correspond to quasi-coherent sheaves. We then apply this framework to proving an equivalence of categories between derived categories on the noncommutative complex torus and on a holomorphic gerbe on the dual complex torus.

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Equivariant cyclic homology and equivariant differential forms

Block¹,

Getzler²

1994

Ann. Sci. École Norm. Sup.

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André–Quillen cohomology and rational homotopy of function spaces

Block

Lazarev

2005

Advances in Mathematics

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Asymptotic pseudodifferential operators and index theory

Block¹,

Fox²

1990

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Jonathan Block

Aperiodic tilings, positive scalar curvature, and amenability of spaces

Duality and equivalence of module categories in noncommutative geometry

Equivariant cyclic homology and equivariant differential forms

André–Quillen cohomology and rational homotopy of function spaces

Asymptotic pseudodifferential operators and index theory

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