Add to ORKGThis article concerns the asymptotic behavior of minimizers of a p-energy functional with penalization as a parameter epsilon approaches zero. By establishing $W^{1,p}$ uniform estimates, we obtain $W^{1,p}$ convergence of the minimizer to a p-harmonic map
We study minimizers of a family of functionals $E_\varepsilon$ indexed by a characteristic length sc...
The energy integral of the calculus of variations, which we consider in this paper, has a limit beha...
The energy integral of the calculus of variations, which we consider in this paper, has a limit beha...
AbstractWe prove that the p(x)-Ginzburg–Landau type minimizers converge to the p(x)-harmonic maps. T...
AbstractThis paper is concerned with the asymptotic behavior of the regularized minimizer uε=(uε1,uε...
AbstractWe prove that the p(x)-Ginzburg–Landau type minimizers converge to the p(x)-harmonic maps. T...
Abstract. The energy-integral of the calculus of variations (1.1), (1.2) below has a limit behavior ...
AbstractThe author studies the minimization of an energy functional which is introduced in the study...
In this article we study the minimizers of the functional $$ E_varepsilon(u,G)={1over p}int_G|abla u...
summary:Minimizers of a functional with exponential growth are shown to be smooth. The techniques de...
We discuss the convergence of minimizers of some perturbations of the Dirichlet energy of maps with ...
We discuss the convergence of minimizers of some perturbations of the Dirichlet energy of maps with ...
AbstractThis paper is concerned about the W1,p convergence for a minimizer uɛ of a Ginzburg–Landau t...
We study minimizers of a family of functionals $E_\varepsilon$ indexed by a characteristic length sc...
AbstractThis paper is concerned with the convergence of a p-Ginzburg–Landau type functional when the...
We study minimizers of a family of functionals $E_\varepsilon$ indexed by a characteristic length sc...
The energy integral of the calculus of variations, which we consider in this paper, has a limit beha...
The energy integral of the calculus of variations, which we consider in this paper, has a limit beha...
AbstractWe prove that the p(x)-Ginzburg–Landau type minimizers converge to the p(x)-harmonic maps. T...
AbstractThis paper is concerned with the asymptotic behavior of the regularized minimizer uε=(uε1,uε...
AbstractWe prove that the p(x)-Ginzburg–Landau type minimizers converge to the p(x)-harmonic maps. T...
Abstract. The energy-integral of the calculus of variations (1.1), (1.2) below has a limit behavior ...
AbstractThe author studies the minimization of an energy functional which is introduced in the study...
In this article we study the minimizers of the functional $$ E_varepsilon(u,G)={1over p}int_G|abla u...
summary:Minimizers of a functional with exponential growth are shown to be smooth. The techniques de...
We discuss the convergence of minimizers of some perturbations of the Dirichlet energy of maps with ...
We discuss the convergence of minimizers of some perturbations of the Dirichlet energy of maps with ...
AbstractThis paper is concerned about the W1,p convergence for a minimizer uɛ of a Ginzburg–Landau t...
We study minimizers of a family of functionals $E_\varepsilon$ indexed by a characteristic length sc...
AbstractThis paper is concerned with the convergence of a p-Ginzburg–Landau type functional when the...
We study minimizers of a family of functionals $E_\varepsilon$ indexed by a characteristic length sc...
The energy integral of the calculus of variations, which we consider in this paper, has a limit beha...
The energy integral of the calculus of variations, which we consider in this paper, has a limit beha...