Add to ORKGLet K ∈ N and Ω ⊂ RN (N ≥ 2K + 1) be a regular bounded domain in RN. We consider the semilinear polyharmonic problem (−∆)Ku = |u|s−2u+ f(x, u) in Ω (1) u> 0 in Ω (2
AbstractWe study nonnegative classical solutions u of the polyharmonic inequality−Δmu⩾0inB1(0)−{0}⊂R...
Let us consider the Dirichlet problem {(-Δ)mu=|u| pα-2u/|x|α+λu in Ω D βu|∂Ω = 0 for |β|≤m-1 where Ω...
Tyt. z nagłówka.Bibliogr. s. 18-19.his paper is concerned with positive solutions of the semilinear ...
We consider a family of polyharmonic problems of the form (−∆)mu = g(x,u) in Ω, Dαu = 0 on ∂Ω, where...
This monograph covers higher order linear and nonlinear elliptic boundary value problems in bounded ...
In the present paper we establish the Wiener test for boundary regularity of the solutions to the po...
We prove a Plemelj type formula for general potentials in $C^{1}$ domains. By means of that we obta...
We consider a class of eigenvalue problems for polyharmonic operators, including Dirichlet...
This paper is concerned with positive solutions of the semilinear polyharmonic equation $(-\Delta)^m...
This paper deals with Lopatinskii type boundary value problem (bvp) for the (poly) harmonic differen...
We consider the equation Delta(2)u = g(x, u) >= 0 in the sense of distribution in Omega' = Omega\tex...
In this paper, we study the Brezis-Nirenberg problem on bounded smooth domains of R3. Using the alge...
In this work, we study the existence of positive solutions in semilinear critical problems for polyh...
AbstractWe continue Part I of this paper on polyharmonic boundary value problems (−Δ)mu=f(u) on Ω⊂Rn...
We consider a class of eigenvalue problems for polyharmonic operators, including Dirichlet and buckl...
AbstractWe study nonnegative classical solutions u of the polyharmonic inequality−Δmu⩾0inB1(0)−{0}⊂R...
Let us consider the Dirichlet problem {(-Δ)mu=|u| pα-2u/|x|α+λu in Ω D βu|∂Ω = 0 for |β|≤m-1 where Ω...
Tyt. z nagłówka.Bibliogr. s. 18-19.his paper is concerned with positive solutions of the semilinear ...
We consider a family of polyharmonic problems of the form (−∆)mu = g(x,u) in Ω, Dαu = 0 on ∂Ω, where...
This monograph covers higher order linear and nonlinear elliptic boundary value problems in bounded ...
In the present paper we establish the Wiener test for boundary regularity of the solutions to the po...
We prove a Plemelj type formula for general potentials in $C^{1}$ domains. By means of that we obta...
We consider a class of eigenvalue problems for polyharmonic operators, including Dirichlet...
This paper is concerned with positive solutions of the semilinear polyharmonic equation $(-\Delta)^m...
This paper deals with Lopatinskii type boundary value problem (bvp) for the (poly) harmonic differen...
We consider the equation Delta(2)u = g(x, u) >= 0 in the sense of distribution in Omega' = Omega\tex...
In this paper, we study the Brezis-Nirenberg problem on bounded smooth domains of R3. Using the alge...
In this work, we study the existence of positive solutions in semilinear critical problems for polyh...
AbstractWe continue Part I of this paper on polyharmonic boundary value problems (−Δ)mu=f(u) on Ω⊂Rn...
We consider a class of eigenvalue problems for polyharmonic operators, including Dirichlet and buckl...
AbstractWe study nonnegative classical solutions u of the polyharmonic inequality−Δmu⩾0inB1(0)−{0}⊂R...
Let us consider the Dirichlet problem {(-Δ)mu=|u| pα-2u/|x|α+λu in Ω D βu|∂Ω = 0 for |β|≤m-1 where Ω...
Tyt. z nagłówka.Bibliogr. s. 18-19.his paper is concerned with positive solutions of the semilinear ...