Gauge fluctuations and transition temperature for superconducting wires
Abstract
We consider the Ginzburg-Landau model, confined in an infinitely long rectangular wire of cross-section L1× L2. Our approach is based on the Gaussian effective potential in the transverse unitarity gauge, which allows to treat gauge contributions in a compact form. The contributions from the scalar self-interaction and from the gauge fluctuations are clearly identified. Using techniques from dimensional and zeta-function regularizations, modified by the confinement conditions, we investigate the critical temperature for a wire of transverse dimensions L1, L2. Taking the mass term in the form m02=a(T/T0 - 1), where T0 is the bulk transition temperature, we obtain equations for the critical temperature as a function of the Li's and of T0, and determine the limiting sizes sustaining the transition. A qualitative comparison with some experimental observations is done.
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