International audienceWe prove that, for a conelike stratified diffeological spaces, a zero-perverse form is the restriction of a global differential form if and only if its index is equal to 1 for every stratum
Abstract. This paper is concerned with state-constrained discontinuous or-dinary differential equati...
In this thesis, we study some linear and nonlinear problems involving differential forms. We begin b...
In this paper we give a survey on transversality theorems for stratified spaces which have appeared ...
International audienceWe prove that, for a conelike stratified diffeological spaces, a zero-perverse...
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 audienceFirst, we extend the notion of stratified spaces to diffeology. Then we charac...
International audienceFirst, we extend the notion of stratified spaces to diffeology. Then we charac...
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 ...
This paper is to extend the Poincar’e Lemma for differential forms in a bounded, convex domain [1] i...
In this paper, on a connected set composed of finitely many convex polyhedra of different dimensions...
yesIn this paper, on a connected set composed of finitely many convex polyhedra of different dimensi...
Abstract. We develop a theory of smoothly stratified spaces and their moduli, including a notion of ...
Abstract. This paper is concerned with state-constrained discontinuous or-dinary differential equati...
In this thesis, we study some linear and nonlinear problems involving differential forms. We begin b...
In this paper we give a survey on transversality theorems for stratified spaces which have appeared ...
International audienceWe prove that, for a conelike stratified diffeological spaces, a zero-perverse...
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 audienceFirst, we extend the notion of stratified spaces to diffeology. Then we charac...
International audienceFirst, we extend the notion of stratified spaces to diffeology. Then we charac...
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 ...
This paper is to extend the Poincar’e Lemma for differential forms in a bounded, convex domain [1] i...
In this paper, on a connected set composed of finitely many convex polyhedra of different dimensions...
yesIn this paper, on a connected set composed of finitely many convex polyhedra of different dimensi...
Abstract. We develop a theory of smoothly stratified spaces and their moduli, including a notion of ...
Abstract. This paper is concerned with state-constrained discontinuous or-dinary differential equati...
In this thesis, we study some linear and nonlinear problems involving differential forms. We begin b...
In this paper we give a survey on transversality theorems for stratified spaces which have appeared ...