Add to ORKGAbstract. We obtain the variant of maximum principle for radial solu-tions of p-harmonic equation −a∆p(w) = φ(w). As a consequence of this result we prove monotonicity of constant sign solutions, analyze the sup-port of the solutions and study their oscillations. The results are applied to various type nonlinear eigenvalue problems and nonexistence theorems. 1
We study the maximum principle and existence of positive solutions for the nonlinear system egin{ga...
AbstractIt is well known that all the eigenvalues of the linear eigenvalue problemΔu=(q−λr)u,in Ω⊂RN...
Several problems for the differential equation Lpαu=g(r,u)  with  Lpαu=r−α(r...
We obtain the variant of maximum principle for radial solutions of $p$-harmonic equation $-a\D...
For the p-Laplacian p = div:(| |p–2), p>1, the eigenvalue problem –p + q(|x|)||p–2 = ||p–2 i...
Abstract. This paper is concerned about maximum principles and radial symmetry for viscosity solutio...
We establish a maximum principle for the weighted $(p,q)$-Laplacian, which extends the general Pucci...
AbstractWe prove that an asymptotically linear Dirichlet problem which involves the p-Laplacian oper...
Brown and Reichel recently established the existence of eigenvalues for the p-Laplacian on R+ when t...
Abstract. In this paper we study the maximum and the anti-maximum prin-ciples for the problem ∆pu = ...
In this paper we study the strong maximum principle for equations of the form F[u] = H(u, |Du|) wher...
AbstractBrown and Reichel recently established the existence of eigenvalues for the p-Laplacian on R...
We study the existence of positive solutions for perturbations of the classical eigenvalue problem ...
We study the global structure of the set of radial solutions of a nonlinear Dirichlet eigenvalue pr...
AbstractThis paper focuses on a nonlinear equation from thin plate theory of the form Δ(D(x)Δw)−(1−ν...
We study the maximum principle and existence of positive solutions for the nonlinear system egin{ga...
AbstractIt is well known that all the eigenvalues of the linear eigenvalue problemΔu=(q−λr)u,in Ω⊂RN...
Several problems for the differential equation Lpαu=g(r,u)  with  Lpαu=r−α(r...
We obtain the variant of maximum principle for radial solutions of $p$-harmonic equation $-a\D...
For the p-Laplacian p = div:(| |p–2), p>1, the eigenvalue problem –p + q(|x|)||p–2 = ||p–2 i...
Abstract. This paper is concerned about maximum principles and radial symmetry for viscosity solutio...
We establish a maximum principle for the weighted $(p,q)$-Laplacian, which extends the general Pucci...
AbstractWe prove that an asymptotically linear Dirichlet problem which involves the p-Laplacian oper...
Brown and Reichel recently established the existence of eigenvalues for the p-Laplacian on R+ when t...
Abstract. In this paper we study the maximum and the anti-maximum prin-ciples for the problem ∆pu = ...
In this paper we study the strong maximum principle for equations of the form F[u] = H(u, |Du|) wher...
AbstractBrown and Reichel recently established the existence of eigenvalues for the p-Laplacian on R...
We study the existence of positive solutions for perturbations of the classical eigenvalue problem ...
We study the global structure of the set of radial solutions of a nonlinear Dirichlet eigenvalue pr...
AbstractThis paper focuses on a nonlinear equation from thin plate theory of the form Δ(D(x)Δw)−(1−ν...
We study the maximum principle and existence of positive solutions for the nonlinear system egin{ga...
AbstractIt is well known that all the eigenvalues of the linear eigenvalue problemΔu=(q−λr)u,in Ω⊂RN...
Several problems for the differential equation Lpαu=g(r,u)  with  Lpαu=r−α(r...