AbstractWe address some generalizations of the maximum principle for weak solutions of quasi-linear equations of the type −Δpu+b|u|p−2u=f(⋅,u) in an open set Ω⊂RN. The novelty of our work concerns more general assumptions both on the right-hand side f and the set Ω
summary:We consider the quasilinear equation $\Delta _p u +K(|x|)u^q=0$, and present the proof of th...
AbstractVazquez in 1984 established a strong maximum principle for the classical m-Laplace different...
We study the existence of weak solutions for a degenerate p(x)-Laplace equation. The main tool used ...
summary:We discuss how the choice of the functional setting and the definition of the weak solution ...
summary:We discuss how the choice of the functional setting and the definition of the weak solution ...
summary:This lecture follows a joint result of the speaker and Daniel Daners. To make the exposition...
summary:This lecture follows a joint result of the speaker and Daniel Daners. To make the exposition...
The paper focuses on a Dirichlet problem driven by the (p,q)-Laplacian containing a parameter $mu$ ...
AbstractWe introduce a class of weak solutions to the quasilinear equation −Δpu=σ|u|p−2u in an open ...
AbstractWe address some generalizations of the maximum principle for weak solutions of quasi-linear ...
AbstractThis paper studies the p-Laplacian equation −Δpu+λVλ(x)|u|p−2u=f(x,u)inRN, where 1<p<N,λ≥1 a...
AbstractWe consider the strong maximum principle and the compact support principle for quasilinear e...
In this paper, we study a class of quasilinear elliptic equations with ΦLaplacian operator and criti...
AbstractIn this work we study the existence, multiplicity and concentration of positive solutions fo...
AbstractWe study the boundary value problem of the quasi-linear elliptic equationdiv(|∇u|m−2∇u)+f(x,...
summary:We consider the quasilinear equation $\Delta _p u +K(|x|)u^q=0$, and present the proof of th...
AbstractVazquez in 1984 established a strong maximum principle for the classical m-Laplace different...
We study the existence of weak solutions for a degenerate p(x)-Laplace equation. The main tool used ...
summary:We discuss how the choice of the functional setting and the definition of the weak solution ...
summary:We discuss how the choice of the functional setting and the definition of the weak solution ...
summary:This lecture follows a joint result of the speaker and Daniel Daners. To make the exposition...
summary:This lecture follows a joint result of the speaker and Daniel Daners. To make the exposition...
The paper focuses on a Dirichlet problem driven by the (p,q)-Laplacian containing a parameter $mu$ ...
AbstractWe introduce a class of weak solutions to the quasilinear equation −Δpu=σ|u|p−2u in an open ...
AbstractWe address some generalizations of the maximum principle for weak solutions of quasi-linear ...
AbstractThis paper studies the p-Laplacian equation −Δpu+λVλ(x)|u|p−2u=f(x,u)inRN, where 1<p<N,λ≥1 a...
AbstractWe consider the strong maximum principle and the compact support principle for quasilinear e...
In this paper, we study a class of quasilinear elliptic equations with ΦLaplacian operator and criti...
AbstractIn this work we study the existence, multiplicity and concentration of positive solutions fo...
AbstractWe study the boundary value problem of the quasi-linear elliptic equationdiv(|∇u|m−2∇u)+f(x,...
summary:We consider the quasilinear equation $\Delta _p u +K(|x|)u^q=0$, and present the proof of th...
AbstractVazquez in 1984 established a strong maximum principle for the classical m-Laplace different...
We study the existence of weak solutions for a degenerate p(x)-Laplace equation. The main tool used ...
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