Add to ORKGThere has been a substantial amount of work in the area of elliptic, constant coefficient PDE’s in Lipschitz domains via layer potential methods. In particular, the classical Dirichlet and Neumann boundary value problems for the flat-space Laplacian ∂21 + · · · + ∂2n with boundary data in Lp spaces for optimal ranges of
Abstract. These notes discuss results on layer potential methods for elliptic boundary problems, wit...
We use the method of layer potentials to study interior and exterior Dirichlet and Neumann problems ...
We extend to the variable coefficient case boundary layer techniques that have been successful in th...
AbstractLet Ω be a bounded Lipschitz domain in Rn. We develop a new approach to the invertibility on...
AbstractVarious layer potential operators are constructed for general elliptic systems of partial di...
We continue a program to develop layer potential techniques for PDE on Lipschitz domains in Riemanni...
We continue a program to develop layer potential techniques for PDE on Lipschitz domains in Riemanni...
AbstractWe extend to the variable coefficient case boundary layer techniques that have been successf...
AbstractFor D, a bounded Lipschitz domain in Rn, n ⩾ 2, the classical layer potentials for Laplace's...
AbstractWe continue a program to develop layer potential techniques for PDE on Lipschitz domains in ...
This is a continuation of our paper “Boundary layer methods for Lipschitz do-mains in Riemannian man...
We develop a simple variational argument based on the usual Niren- berg’s difference quotient techni...
Abstract. Let Ω be a bounded Lipschitz domain in Rn, n ≥ 3. Let L be a second order elliptic system ...
We develop a simple variational argument based on the usual Niren- berg’s difference quotient techni...
Dedicated to the memory of Lars Hedberg and his contributions to nonlinear potential theory Abstract...
Abstract. These notes discuss results on layer potential methods for elliptic boundary problems, wit...
We use the method of layer potentials to study interior and exterior Dirichlet and Neumann problems ...
We extend to the variable coefficient case boundary layer techniques that have been successful in th...
AbstractLet Ω be a bounded Lipschitz domain in Rn. We develop a new approach to the invertibility on...
AbstractVarious layer potential operators are constructed for general elliptic systems of partial di...
We continue a program to develop layer potential techniques for PDE on Lipschitz domains in Riemanni...
We continue a program to develop layer potential techniques for PDE on Lipschitz domains in Riemanni...
AbstractWe extend to the variable coefficient case boundary layer techniques that have been successf...
AbstractFor D, a bounded Lipschitz domain in Rn, n ⩾ 2, the classical layer potentials for Laplace's...
AbstractWe continue a program to develop layer potential techniques for PDE on Lipschitz domains in ...
This is a continuation of our paper “Boundary layer methods for Lipschitz do-mains in Riemannian man...
We develop a simple variational argument based on the usual Niren- berg’s difference quotient techni...
Abstract. Let Ω be a bounded Lipschitz domain in Rn, n ≥ 3. Let L be a second order elliptic system ...
We develop a simple variational argument based on the usual Niren- berg’s difference quotient techni...
Dedicated to the memory of Lars Hedberg and his contributions to nonlinear potential theory Abstract...
Abstract. These notes discuss results on layer potential methods for elliptic boundary problems, wit...
We use the method of layer potentials to study interior and exterior Dirichlet and Neumann problems ...
We extend to the variable coefficient case boundary layer techniques that have been successful in th...