Add to ORKGWe investigate the standard stable manifold theorem in the context of a partially hyperbolic singu-larity of a vector field depending on a parameter. We prove some estimates on the size of the neighbourhood where the local stable manifold is known to be the graph of a function, and some estimates about the derivatives of all orders of this function. We explicitate the different constants arising and their dependance on the vector field. As an application, we consider the situation where a vector field vanishes on a submanifold N and contracts a direction transverse to N. We prove some estimates on the size of the neighbourhood of N where there are some charts straightening the stable foliation while giving some controls on the derivatives o...
We show some area estimates for stable CMC hypersurfaces immersed in Riemannian manifolds with scala...
There is a slight disparity in smooth ergodic theory, between Pesin the-ory and the Pugh-Shub partia...
Let $X$ be a smooth projective variety. Define a stable map $f:C\to X$ to be "eventually smoothable"...
We investigate the standard stable manifold theorem in the context of a partially hyperbolic singu-l...
AbstractWe present an argument for proving the existence of local stable and unstable manifolds in a...
We state and prove a Local Stable Manifold Theorem (Theorem 4.1) for non- linear stochastic differen...
A -lemma for normally hyperbolic manifolds asserts that, given a smooth manifold M and a diffeomorph...
AbstractThe index of a stable equilibrium can be any integer in dimensions greater than 3, and any i...
Under the assumption of prox-regularity and the presence of a tilt stable local minimum we are able ...
A result due to M.W. Hirsch states that most competitive maps admit a carrying simplex, i.e., an inv...
In this paper we study the Arnold diffusion along a normally hyperbolic invariant manifold in a mode...
AbstractIn this paper we consider Cherry Vector Fields on the torus with exactly two singularities: ...
AbstractThe real homology of a compact Riemannian manifold M is naturally endowed with the stable no...
We establish the existence of smooth invariant stable manifolds for differential equations $u'=A(t)u...
AbstractLet X be a vector field on M3 which exhibits a saddle connection between a singularity p1 an...
We show some area estimates for stable CMC hypersurfaces immersed in Riemannian manifolds with scala...
There is a slight disparity in smooth ergodic theory, between Pesin the-ory and the Pugh-Shub partia...
Let $X$ be a smooth projective variety. Define a stable map $f:C\to X$ to be "eventually smoothable"...
We investigate the standard stable manifold theorem in the context of a partially hyperbolic singu-l...
AbstractWe present an argument for proving the existence of local stable and unstable manifolds in a...
We state and prove a Local Stable Manifold Theorem (Theorem 4.1) for non- linear stochastic differen...
A -lemma for normally hyperbolic manifolds asserts that, given a smooth manifold M and a diffeomorph...
AbstractThe index of a stable equilibrium can be any integer in dimensions greater than 3, and any i...
Under the assumption of prox-regularity and the presence of a tilt stable local minimum we are able ...
A result due to M.W. Hirsch states that most competitive maps admit a carrying simplex, i.e., an inv...
In this paper we study the Arnold diffusion along a normally hyperbolic invariant manifold in a mode...
AbstractIn this paper we consider Cherry Vector Fields on the torus with exactly two singularities: ...
AbstractThe real homology of a compact Riemannian manifold M is naturally endowed with the stable no...
We establish the existence of smooth invariant stable manifolds for differential equations $u'=A(t)u...
AbstractLet X be a vector field on M3 which exhibits a saddle connection between a singularity p1 an...
We show some area estimates for stable CMC hypersurfaces immersed in Riemannian manifolds with scala...
There is a slight disparity in smooth ergodic theory, between Pesin the-ory and the Pugh-Shub partia...
Let $X$ be a smooth projective variety. Define a stable map $f:C\to X$ to be "eventually smoothable"...