A Homotopy Theoretical Derivation of Q Map (K, -).
Cohomology of some graded differential algebras
We study cohomology algebras of graded differential algebras which are models for Hochschild homology of some classes of topological spaces (e.g. homogeneous spaces of compact Lie groups). Explicit formulae are obtained. Some applications to cyclic homology are given.
Curvature, tangentiality, and controlled topology.
Extension categories and their homotopy
Noncommutative localisation in algebraic -theory. I.
On modified Reedy and modified projective model structures.
On the real cohomology of spaces of free loops on manifolds
Let LX be the space of free loops on a simply connected manifold X. When the real cohomology of X is a tensor product of algebras generated by a single element, we determine the algebra structure of the real cohomology of LX by using the cyclic bar complex of the de Rham complex Ω(X) of X. In consequence, the algebra generators of the real cohomology of LX can be represented by differential forms on LX through Chen’s iterated integral map. Let be the circle group. The -equivariant cohomology...
The connection between the -theory localization theorem of Thomason, Trobaugh and Yao and the smashing subcategories of Bousfield and Ravenel
The cyclotomic trace and algebraic K-theory of spaces.
The Hatcher-Waldhausen map is a spectrum map.
The smooth Whitehead spectrum of a point at odd regular primes.
Units of ring spectra and their traces in algebraic K-theory.