We show that the convergence, as $p\to\infty$, of the solution $u_p$ of the Dirichlet problem for $-\Delta_p u(x)=f(x)$ in a bounded domain $\Omega\subset{\hbox{\bf R}}^n$ with zero-Dirichlet boundary condition and with continuous $f$ in the following cases: (i) one-dimensional case, radial cases; (ii) the case of no balanced family; and (iii) two cases with vanishing integral. We also give some properties of the maximizers for the functional $\int_\Omega f(x)v(x)\d x$ in the space of functions $v\in C(\overline\Omega)\cap W^{1,\infty}(\Omega)$ satisfying $v|_{\partial\Omega}=0$ and $\|Dv\|_{L^\infty(\Omega)}\leq 1$
In this paper we study the behavior as p→∞ of solutions up,q to −Δpu−Δqu=0 in a bounded smooth domai...
We prove the existence of a unique bounded weak solution in C(Rn \ K) ∩ W 1,p loc (R n \ K) of the e...
We give global estimates on some potential of functions in a bounded domain of the Euclidean space...
Let 1 < p < N, and u be a nonnegative solution of -Delta(p)u = f (x, u) on R-N\(B-1) over bar where ...
Let Omega be an open bounded subset of Rn and f a continuous function on Omega satisfying f(x) > 0 f...
In this article the authors prove a theorem regarding the convergence of solutions for the problems ...
Abstract. In this work we study the behaviour of the solutions to the following Dirichlet problem re...
We investigate the asymptotic behaviour as p -> infinity of sequences of solutions of the equation {...
In this paper, the existence of at least three weak solutions for Dirich-let problem { Δpu + λf(x, u...
In this article we consider the p-Laplace equation on a smooth bounded domain of with zero Dirichlet...
Abstract In this paper, by using Karamata regular variation theory and the method of upper and lower...
AbstractThe aim of the paper is to characterise sequences of domains for which solutions to an ellip...
We obtain solutions bounded for all $t \in (-\infty,\infty)$ of systems of ordinary differential eq...
Abstract. In this paper we study the behavior as p→ ∞ of solutions up,q to −∆pu−∆qu = 0 in a bounded...
We consider the following problem: given a bounded convex domain Ω⊂ℝN${\Omega \subset \mathbb {R}^N}...
In this paper we study the behavior as p→∞ of solutions up,q to −Δpu−Δqu=0 in a bounded smooth domai...
We prove the existence of a unique bounded weak solution in C(Rn \ K) ∩ W 1,p loc (R n \ K) of the e...
We give global estimates on some potential of functions in a bounded domain of the Euclidean space...
Let 1 < p < N, and u be a nonnegative solution of -Delta(p)u = f (x, u) on R-N\(B-1) over bar where ...
Let Omega be an open bounded subset of Rn and f a continuous function on Omega satisfying f(x) > 0 f...
In this article the authors prove a theorem regarding the convergence of solutions for the problems ...
Abstract. In this work we study the behaviour of the solutions to the following Dirichlet problem re...
We investigate the asymptotic behaviour as p -> infinity of sequences of solutions of the equation {...
In this paper, the existence of at least three weak solutions for Dirich-let problem { Δpu + λf(x, u...
In this article we consider the p-Laplace equation on a smooth bounded domain of with zero Dirichlet...
Abstract In this paper, by using Karamata regular variation theory and the method of upper and lower...
AbstractThe aim of the paper is to characterise sequences of domains for which solutions to an ellip...
We obtain solutions bounded for all $t \in (-\infty,\infty)$ of systems of ordinary differential eq...
Abstract. In this paper we study the behavior as p→ ∞ of solutions up,q to −∆pu−∆qu = 0 in a bounded...
We consider the following problem: given a bounded convex domain Ω⊂ℝN${\Omega \subset \mathbb {R}^N}...
In this paper we study the behavior as p→∞ of solutions up,q to −Δpu−Δqu=0 in a bounded smooth domai...
We prove the existence of a unique bounded weak solution in C(Rn \ K) ∩ W 1,p loc (R n \ K) of the e...
We give global estimates on some potential of functions in a bounded domain of the Euclidean space...