Add to ORKGWe give a definition of the scanning map for configuration spaces that is equivariant under the action of the diffeomorphism group of the underlying manifold. We use this to extend the Bödigheimer-Madsen result for the stable splittings of the Borel constructions of certain mapping spaces from compact Lie group actions to all smooth actions. Moreover, we construct a stable splitting of configuration spaces which is equivariant under smooth group actions, completing a zig-zag of equivariant stable homotopy equivalences between mapping spaces and certain wedge sums of spaces. Finally we generalise these results to configuration spaces with twisted labels (labels in a fibre bundle subject to certain conditions) and extend the Bödigheimer-Madse...
The compression theorem is used to prove results for equivariant configuration spaces that are analo...
We begin with the observation that a group G is just a category with one object where every morphism...
Abstract. We study uniform and coarse embeddings between Banach spaces and topological groups. A par...
Replacing configurations of points by configurations of tubular neighbourhoods (or discs) in a manif...
We construct the configuration space of points in a smooth manifold with twisted noncommutative part...
We prove global equivariant refinements of Miller's stable splittings of the infinite orthogonal, un...
In this thesis we study the homological behaviour of configuration spaces as the number of objects i...
In this thesis, we study the stable homotopy theory of mapping spaces whose domains are surfaces. Cl...
Abstract. We study the homotopy type of mapping spaces from Riemann surfaces to spheres. Our main re...
AbstractIn this paper configuration spaces of smooth manifolds are considered. The accent is made on...
The generalized configuration spaces are the different fat sub-diagonals of the cartesian product of...
AbstractIf π:X→X/G is a covering projection, where G is a group of homeomorphisms (diffeomorphisms) ...
We introduce the space of equivariant local maps and present the full proof of the splitting theorem...
We generalize two classical homotopy theory results, the Blakers–Massey theorem and Quillen’s Theore...
2We describe some operator theoretical features of equivariant stable homo-topy. We pursue mainly th...
The compression theorem is used to prove results for equivariant configuration spaces that are analo...
We begin with the observation that a group G is just a category with one object where every morphism...
Abstract. We study uniform and coarse embeddings between Banach spaces and topological groups. A par...
Replacing configurations of points by configurations of tubular neighbourhoods (or discs) in a manif...
We construct the configuration space of points in a smooth manifold with twisted noncommutative part...
We prove global equivariant refinements of Miller's stable splittings of the infinite orthogonal, un...
In this thesis we study the homological behaviour of configuration spaces as the number of objects i...
In this thesis, we study the stable homotopy theory of mapping spaces whose domains are surfaces. Cl...
Abstract. We study the homotopy type of mapping spaces from Riemann surfaces to spheres. Our main re...
AbstractIn this paper configuration spaces of smooth manifolds are considered. The accent is made on...
The generalized configuration spaces are the different fat sub-diagonals of the cartesian product of...
AbstractIf π:X→X/G is a covering projection, where G is a group of homeomorphisms (diffeomorphisms) ...
We introduce the space of equivariant local maps and present the full proof of the splitting theorem...
We generalize two classical homotopy theory results, the Blakers–Massey theorem and Quillen’s Theore...
2We describe some operator theoretical features of equivariant stable homo-topy. We pursue mainly th...
The compression theorem is used to prove results for equivariant configuration spaces that are analo...
We begin with the observation that a group G is just a category with one object where every morphism...
Abstract. We study uniform and coarse embeddings between Banach spaces and topological groups. A par...