AbstractWe study a degenerate oblique derivative problem in Sobolev spaces W2,p(Ω),∀p>1, for uniformly elliptic operators with Lipschitz continuous coefficients. The vector field prescribing the boundary condition becomes tangential to ∂Ω at the points of a non-empty set and is of emergent type
AbstractStrong solvability in the Sobolev space W2,p(Ω) is proved for the oblique derivative problem...
発表会議: Partial Differential Equations and Applications開催場所: University of Bologna (Italy) 開催日時: 2017年...
We study elliptic and parabolic problems governed by the singular elliptic operators \begin{align*} ...
AbstractWe study a degenerate oblique derivative problem in Sobolev spaces W2,p(Ω),∀p>1, for uniform...
AbstractWe study elliptic operators L with Dirichlet boundary conditions on a bounded domain Ω whose...
AbstractHarmonic functions defined in Lipschitz domains of the plane that have gradient nontangentia...
Abstract. A degenerate oblique derivative problem is studied for uniformly elliptic operators with l...
AbstractWe consider a nonlinear (possibly) degenerate elliptic operator Lv=−diva(∇v)+b(x,v) where th...
This text is devoted to maximal regularity results for second order parabolic systems on LIPSCHITZ d...
summary:A priori estimates and strong solvability results in Sobolev space $W^{2,p}(\Omega)$, $1<p<\...
In this paper linear elliptic boundary value problems of second order with non-smooth data (L∞-coeff...
International audienceInspired by the penalization of the domain approach of Lions \& Sznitman, we g...
AbstractIn this paper we give some geometric criteria (analogous to Wiener's, Poincaré's and Zaremba...
AbstractThis study focuses on nonlocal boundary value problems (BVP) for degenerate elliptic differe...
AbstractFor second order linear equations and inequalities which are degenerate elliptic but which p...
AbstractStrong solvability in the Sobolev space W2,p(Ω) is proved for the oblique derivative problem...
発表会議: Partial Differential Equations and Applications開催場所: University of Bologna (Italy) 開催日時: 2017年...
We study elliptic and parabolic problems governed by the singular elliptic operators \begin{align*} ...
AbstractWe study a degenerate oblique derivative problem in Sobolev spaces W2,p(Ω),∀p>1, for uniform...
AbstractWe study elliptic operators L with Dirichlet boundary conditions on a bounded domain Ω whose...
AbstractHarmonic functions defined in Lipschitz domains of the plane that have gradient nontangentia...
Abstract. A degenerate oblique derivative problem is studied for uniformly elliptic operators with l...
AbstractWe consider a nonlinear (possibly) degenerate elliptic operator Lv=−diva(∇v)+b(x,v) where th...
This text is devoted to maximal regularity results for second order parabolic systems on LIPSCHITZ d...
summary:A priori estimates and strong solvability results in Sobolev space $W^{2,p}(\Omega)$, $1<p<\...
In this paper linear elliptic boundary value problems of second order with non-smooth data (L∞-coeff...
International audienceInspired by the penalization of the domain approach of Lions \& Sznitman, we g...
AbstractIn this paper we give some geometric criteria (analogous to Wiener's, Poincaré's and Zaremba...
AbstractThis study focuses on nonlocal boundary value problems (BVP) for degenerate elliptic differe...
AbstractFor second order linear equations and inequalities which are degenerate elliptic but which p...
AbstractStrong solvability in the Sobolev space W2,p(Ω) is proved for the oblique derivative problem...
発表会議: Partial Differential Equations and Applications開催場所: University of Bologna (Italy) 開催日時: 2017年...
We study elliptic and parabolic problems governed by the singular elliptic operators \begin{align*} ...
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