Concentration Behavior and Lattice Structure of Surface Superconductivity

TL;DR

This paper investigates the surface superconductivity in a 3D Ginzburg-Landau model under strong magnetic fields, revealing how energy depends on magnetic field orientation and analyzing the lattice structure near the boundary.

Contribution

It introduces a half-space Ginzburg-Landau model to analyze surface effects and provides new insights into energy minimization and lattice configurations near the boundary.

Findings

Energy decreases with the angle of magnetic field to the boundary.

Leading order energy when magnetic field is tangent is determined by a 1D functional.

Constructs formal solutions illustrating lattice properties near the surface.

Abstract

We study the three-dimensional Ginzburg-Landau model of superconductivity for strong applied magnetic fields varying between the second and third critical fields. In this regime, it is known from physics that superconductivity should be essentially restricted to a thin layer along the boundary of the sample. This leads to the introduction of a Ginzburg-Landau model on a half-space. We prove that the non-linear Ginzburg-Landau energy on the half-space with constant magnetic field is a decreasing function of the angle $\nu$ that the magnetic field makes with the boundary. In the case when the magnetic field is tangent to the boundary ($\nu=0$), we show that the energy is determined to leading order by the minimization of a simplified 1D functional in the direction perpendicular to the boundary. We also study the geometric behavior of the order parameter near the surface of the sample by constructing formal solutions with lattice properties.