Analysis of Minimizers of the Lawrence-Doniach Energy for Superconductors in Applied Fields

Abstract

We analyze minimizers of the Lawrence-Doniach energy for layered superconductors occupying a bounded generalized cylinder, ×[0,L], in R3, where is a bounded simply connected Lipschitz domain in R2. For an applied magnetic field Hex=hexe3 that is perpendicular to the layers with |ε| hexε-2 as ε→ 0, where ε is the reciprocal of the Ginzburg-Landau parameter, we prove an asymptotic formula for the minimum Lawrence-Doniach energy as ε and the interlayer distance s tend to zero. Under appropriate assumptions on s versus ε, we establish comparison results between the minimum Lawrence-Doniach energy and the minimum three-dimensional anisotropic Ginzburg-Landau energy. As a consequence, our asymptotic formula also describes the minimum three-dimensional anisotropic energy as ε tends to zero.