AbstractWe study the invertibility of βI+K and βI+K′ in L2(∂Ω) for β∈R∖[−12,12] where K,K′ are double layer potentials related to elasticity equations and Ω is bounded Lipschitz domain in Rn. Consequently, the spectrum on real line lies in [−12,12]. Applications to transmission problems are also presented
AbstractFor D, a bounded Lipschitz domain in Rn, n ⩾ 2, the classical layer potentials for Laplace's...
We investigate transmission problems with strongly Lipschitz interfaces for the Dirac equation by es...
AbstractVarious layer potential operators are constructed for general elliptic systems of partial di...
International audienceRegularization techniques for the trace and the traction of elastic waves pote...
International audienceRegularization techniques for the trace and the traction of elastic waves pote...
AbstractWe prove the well-posedness of the transmission problem for the Laplacian across a Lipschitz...
AbstractLet Ω be a bounded Lipschitz domain in Rn. We develop a new approach to the invertibility on...
We consider a strongly elliptic second-order system in a bounded n-dimensional do-main Ω+ with Lipsc...
Abstract. We study the Green’s function of the linear elasticity in a three dimensional bounded Lips...
AbstractIn this paper we prove that the L2 spectral radius of the traction double layer potential op...
The aim of this thesis is to give a mathematical framework for scattering of electromagnetic waves b...
AbstractWe study the invertibility of βI+K and βI+K′ in L2(∂Ω) for β∈R∖[−12,12] where K,K′ are doubl...
AbstractLet Ω be a bounded domain inRnwithC2-boundary and letDbe a Lipschitz domain withD⊂Ω. We cons...
We use the method of layer potentials to study interior and exterior Dirichlet and Neumann problems ...
Abstract. The paper is devoted to four spectral problems for the Lam¶e system of linear elasticity i...
AbstractFor D, a bounded Lipschitz domain in Rn, n ⩾ 2, the classical layer potentials for Laplace's...
We investigate transmission problems with strongly Lipschitz interfaces for the Dirac equation by es...
AbstractVarious layer potential operators are constructed for general elliptic systems of partial di...
International audienceRegularization techniques for the trace and the traction of elastic waves pote...
International audienceRegularization techniques for the trace and the traction of elastic waves pote...
AbstractWe prove the well-posedness of the transmission problem for the Laplacian across a Lipschitz...
AbstractLet Ω be a bounded Lipschitz domain in Rn. We develop a new approach to the invertibility on...
We consider a strongly elliptic second-order system in a bounded n-dimensional do-main Ω+ with Lipsc...
Abstract. We study the Green’s function of the linear elasticity in a three dimensional bounded Lips...
AbstractIn this paper we prove that the L2 spectral radius of the traction double layer potential op...
The aim of this thesis is to give a mathematical framework for scattering of electromagnetic waves b...
AbstractWe study the invertibility of βI+K and βI+K′ in L2(∂Ω) for β∈R∖[−12,12] where K,K′ are doubl...
AbstractLet Ω be a bounded domain inRnwithC2-boundary and letDbe a Lipschitz domain withD⊂Ω. We cons...
We use the method of layer potentials to study interior and exterior Dirichlet and Neumann problems ...
Abstract. The paper is devoted to four spectral problems for the Lam¶e system of linear elasticity i...
AbstractFor D, a bounded Lipschitz domain in Rn, n ⩾ 2, the classical layer potentials for Laplace's...
We investigate transmission problems with strongly Lipschitz interfaces for the Dirac equation by es...
AbstractVarious layer potential operators are constructed for general elliptic systems of partial di...
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