Hochschild Cohomology for Complex Spaces and Noetherian Schemes

The Künneth Formula for Nuclear Df -spaces and Hochschild Cohomology

We consider complexes (X , d) of nuclear Fréchet spaces and continuous boundary maps dn with closed ranges and prove that, up to topological isomorphism, (Hn(X , d)) ∗ ∼= H(X ∗, d∗), where (Hn(X , d)) ∗ is the strong dual space of the homology group of (X , d) and H(X ∗, d∗) is the cohomology group of the strong dual complex (X ∗, d∗). We use this result to establish the existence of topologica...

Infinitesimal deformation quantization of complex analytic spaces

For the physical aspects of deformation quantization we refer to the expository and survey papers [4] and [10]. Our objective is to initiate a version of global theory of quantization deformation in the category of complex analytic spaces in the same lines as the theory of (commutative) deformation. The goal of inifinitesimal theory is to do few steps towards construction of a star-product in t...

Second Hochschild Cohomology of Convolution Algebras

Dualising Complexes and Twisted Hochschild (co)homology for Noetherian Hopf Algebras

We show that many noetherian Hopf algebras A have a rigid dualising complex R with R = A[d]. Here, d is the injective dimension of the algebra and ν is a certain k-algebra automorphism of A, unique up to an inner automorphism. In honour of the finite dimensional theory which is hereby generalised we call ν the Nakayama automorphism of A. We prove that ν = Sξ, where S is the antipode of A and ξ ...

Spaces of Multiplicative Maps between Highly Structured Ring Spectra

We uncover a somewhat surprising connection between spaces of multiplicative maps between A∞-ring spectra and topological Hochschild cohomology. As a consequence we show that such spaces become infinite loop spaces after looping only once. We also prove that any multiplicative cohomology operation in complex cobordisms theory MU canonically lifts to an A∞-map MU → MU . This implies, in particul...