International audienceFollowing \cite{B2}, we introduce a notion of para-products associated to a semi-group. We do not use Fourier transform arguments and the background manifold is doubling, endowed with a sub-laplacian structure. Our main result is a paralinearization theorem in a non-euclidean framework, with an application to the propagation of regularity for some nonlinear PDEs
AbstractWe obtain existence of asymptotically stable nonconstant equilibrium solutions for semilinea...
Let L be a smooth second-order real differential operator in divergence form on a manifold of dimens...
We study obstacle problems involving p-Laplace-type operators in non-convex polygons. We establish r...
The subject is parametrices for semi-linear problems, based on parametrices for linear boundary prob...
The authors consider the solutions of non linear second order parabolic equations/systems that are t...
We prove local Lipschitz regularity for weak solutions to a class of degenerate parabolic PDEs model...
By the use of Moser iteration and Campanato space estimate, the L infinity and C?? regularity estima...
The first part of this thesis is devoted to study the boundary behavior of non-negative solutions of...
In this work we study a variational method for treating parabolic equations that yields new results ...
open2siWe aim at reviewing and extending a number of recent results addressing stability of certain ...
We consider some nonstandard Sobolev spaces in one dimension, in which functions have different reg...
We overview some L p -extensions of the classical divergence theorem to non-compact Riemannian mani...
By the use of Moser iteration and Campanato space estimate, the L-infinity and C-alpha regularity es...
We investigate existence and regularity of a class of semilinear, parametric elliptic PDEs with affi...
We consider some nonstandard Sobolev spaces in one dimension, in which functions have different regu...
AbstractWe obtain existence of asymptotically stable nonconstant equilibrium solutions for semilinea...
Let L be a smooth second-order real differential operator in divergence form on a manifold of dimens...
We study obstacle problems involving p-Laplace-type operators in non-convex polygons. We establish r...
The subject is parametrices for semi-linear problems, based on parametrices for linear boundary prob...
The authors consider the solutions of non linear second order parabolic equations/systems that are t...
We prove local Lipschitz regularity for weak solutions to a class of degenerate parabolic PDEs model...
By the use of Moser iteration and Campanato space estimate, the L infinity and C?? regularity estima...
The first part of this thesis is devoted to study the boundary behavior of non-negative solutions of...
In this work we study a variational method for treating parabolic equations that yields new results ...
open2siWe aim at reviewing and extending a number of recent results addressing stability of certain ...
We consider some nonstandard Sobolev spaces in one dimension, in which functions have different reg...
We overview some L p -extensions of the classical divergence theorem to non-compact Riemannian mani...
By the use of Moser iteration and Campanato space estimate, the L-infinity and C-alpha regularity es...
We investigate existence and regularity of a class of semilinear, parametric elliptic PDEs with affi...
We consider some nonstandard Sobolev spaces in one dimension, in which functions have different regu...
AbstractWe obtain existence of asymptotically stable nonconstant equilibrium solutions for semilinea...
Let L be a smooth second-order real differential operator in divergence form on a manifold of dimens...
We study obstacle problems involving p-Laplace-type operators in non-convex polygons. We establish r...