• Aucun résultat trouvé

On the Ginzburg–Landau Functional in the Surface Superconductivity Regime

N/A
N/A
Protected

Academic year: 2021

Partager "On the Ginzburg–Landau Functional in the Surface Superconductivity Regime"

Copied!
44
0
0

Texte intégral

Loading

Références

Documents relatifs

Once this done, in a second step, coupling energy estimates with an η-ellipticity result (see below) we get that the set where we have a concentration of the energy corresponds to

Shafrir, Minimization of a Ginzburg-Landau type energy de- creasing with potential having a zero of infinite order, en Differential Integral Equations 19, no.10, (2006), p. Struwe,

It is proved that, when vorticity defects are trapped by a diluted impurity, then their lo- cation inside the impurity [the microscopic location] is independent of the

For sake of completeness, we give also the limit behaviour of the previous Ginzburg-Landau equation with homogeneous Dirichlet boundary condition (for scalar problems with

The aim of this final section is to use the structure of the minimizers of the limiting functional F 0,g given by Theorem 4.3 to prove that minimizers of F ε,g 0 have the same

Null controllability of the complex Ginzburg–Landau equation Contrôlabilité à zéro de l’équation de Ginzburg–Landau complexe.. Lionel Rosier a,b, ∗ , Bing-Yu

There is a convenient variational setting for the periodic Ginzburg–Landau equations, we may refer to [20,13] for a mathematically oriented presentation of this setting, the

We consider a spherical superconductor in a uniform external field, and study vortices which appear near the lower critical field, the smallest value of the external field strength