International audienceFirst, we extend the notion of stratified spaces to diffeology. Then we characterise the subspace of stratified differential forms, or zero-perverse forms in the sense of Goresky-MacPherson, which can be extended smoothly into differential forms on the whole space. For that we introduce an index which outlines the behaviour of the perverse forms on the neighbourhood of the singular strata
International audienceNous montrons un Théorème de de Rham entre l'homologie d'intersection et la co...
Stratifications and iterative differential equations are analogues in positive characteristic of com...
For manifolds, topological properties such as Poincaré duality and invariants such as the signature ...
International audienceFirst, we extend the notion of stratified spaces to diffeology. Then we charac...
International audienceWe prove that, for conelike stratified diffeological spaces, a zero-perverse f...
International audienceWe prove that, for conelike stratified diffeological spaces, a zero-perverse f...
International audienceWe prove that, for a conelike stratified diffeological spaces, a zero-perverse...
International audienceWe prove that, for a conelike stratified diffeological spaces, a zero-perverse...
Diffeological and differential spaces are generalisations of smooth structures on manifolds. We show...
Diffeological and differential spaces are generalisations of smooth structures on manifolds. We show...
AbstractWe construct a potential theory for differential forms on compact stratified spaces, and we ...
The book provides an introduction to stratification theory leading the reader up to modern research ...
Abstract. We develop a theory of smoothly stratified spaces and their moduli, including a notion of ...
AbstractWe construct a potential theory for differential forms on compact stratified spaces, and we ...
In this paper we give a survey on transversality theorems for stratified spaces which have appeared ...
International audienceNous montrons un Théorème de de Rham entre l'homologie d'intersection et la co...
Stratifications and iterative differential equations are analogues in positive characteristic of com...
For manifolds, topological properties such as Poincaré duality and invariants such as the signature ...
International audienceFirst, we extend the notion of stratified spaces to diffeology. Then we charac...
International audienceWe prove that, for conelike stratified diffeological spaces, a zero-perverse f...
International audienceWe prove that, for conelike stratified diffeological spaces, a zero-perverse f...
International audienceWe prove that, for a conelike stratified diffeological spaces, a zero-perverse...
International audienceWe prove that, for a conelike stratified diffeological spaces, a zero-perverse...
Diffeological and differential spaces are generalisations of smooth structures on manifolds. We show...
Diffeological and differential spaces are generalisations of smooth structures on manifolds. We show...
AbstractWe construct a potential theory for differential forms on compact stratified spaces, and we ...
The book provides an introduction to stratification theory leading the reader up to modern research ...
Abstract. We develop a theory of smoothly stratified spaces and their moduli, including a notion of ...
AbstractWe construct a potential theory for differential forms on compact stratified spaces, and we ...
In this paper we give a survey on transversality theorems for stratified spaces which have appeared ...
International audienceNous montrons un Théorème de de Rham entre l'homologie d'intersection et la co...
Stratifications and iterative differential equations are analogues in positive characteristic of com...
For manifolds, topological properties such as Poincaré duality and invariants such as the signature ...
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