Add to ORKGIn this paper we revisit an approach pioneered by Auchmuty to approximate solutions of the Laplace- Robin boundary value problem. We demonstrate the efficacy of this approach on a large class of non-tensorial domains, in contrast with other spectral approaches for such problems. We establish a spectral approximation theorem showing an exponential fast numerical evaluation with regards to the number of Steklov eigenfunctions used, for smooth domains and smooth boundary data. A polynomial fast numerical evaluation is observed for either non-smooth domains or non-smooth boundary data. We additionally prove a new result on the regularity of the Steklov eigenfunctions, depending on the regularity of the domain boundary. We describe three num...
The validity of Weyl’s law for the Steklov problem on domains with Lipschitz boundary is a well-know...
We describe a shape derivative approach to provide a candidate for an optimal domain among non-simpl...
We consider the "Method of particular solutions" for numerically computing eigenvalues and eigenfunc...
Eigenfunction expansion methods have been studied in various ways to study solutions of PDEs. This t...
In this work, we provide explicit formulae for harmonic Steklov eigenvalues and associated Steklov e...
We present a method for construction of an approximate basis of the trace space H 1/2 based on a com...
We present some results related with the asymptotic expansion of the eigenvalues for the Schr\ {o}di...
Abstract. The Steklov problem is an eigenvalue problem with the spectral parameter in the boundary c...
We study a new link between the Steklov and Neumann eigenvalues of domains in Euclidean space. This ...
Abstract. The Steklov problem is an eigenvalue problem with the spectral parameter in the boundary c...
In this thesis we study eigenvalue problems with different boundary conditions for some operators of...
We study the spectral stability of two fourth order Steklov problems upon domain perturbation. One ...
We present upper and lower bounds for Steklov eigenvalues for domains in R^N+1 with C^2 boundary com...
We consider how the geometry and topology of a compact n-dimensional Riemannian orbifold with bounda...
We numerically investigate the generalized Steklov problem for the modified Helmholtz equation and f...
The validity of Weyl’s law for the Steklov problem on domains with Lipschitz boundary is a well-know...
We describe a shape derivative approach to provide a candidate for an optimal domain among non-simpl...
We consider the "Method of particular solutions" for numerically computing eigenvalues and eigenfunc...
Eigenfunction expansion methods have been studied in various ways to study solutions of PDEs. This t...
In this work, we provide explicit formulae for harmonic Steklov eigenvalues and associated Steklov e...
We present a method for construction of an approximate basis of the trace space H 1/2 based on a com...
We present some results related with the asymptotic expansion of the eigenvalues for the Schr\ {o}di...
Abstract. The Steklov problem is an eigenvalue problem with the spectral parameter in the boundary c...
We study a new link between the Steklov and Neumann eigenvalues of domains in Euclidean space. This ...
Abstract. The Steklov problem is an eigenvalue problem with the spectral parameter in the boundary c...
In this thesis we study eigenvalue problems with different boundary conditions for some operators of...
We study the spectral stability of two fourth order Steklov problems upon domain perturbation. One ...
We present upper and lower bounds for Steklov eigenvalues for domains in R^N+1 with C^2 boundary com...
We consider how the geometry and topology of a compact n-dimensional Riemannian orbifold with bounda...
We numerically investigate the generalized Steklov problem for the modified Helmholtz equation and f...
The validity of Weyl’s law for the Steklov problem on domains with Lipschitz boundary is a well-know...
We describe a shape derivative approach to provide a candidate for an optimal domain among non-simpl...
We consider the "Method of particular solutions" for numerically computing eigenvalues and eigenfunc...