Superheating fields of semi-infinite superconductors and layered superconductors in the diffusive limit: structural optimization based on the microscopic theory

Abstract

We investigate the superheating fields Hsh of semi-infinite superconductors and layered superconductors in the diffusive limit by using the well-established quasiclassical Green's function formalism of the BCS theory. The coupled Maxwell-Usadel equations are self-consistently solved to obtain the spatial distributions of the magnetic field, screening current density, penetration depth, and pair potential. We find the superheating field of a semi-infinite superconductor in the diffusive limit is given by Hsh = 0.795 Hc0 at the temperature T 0. Here Hc0 is the thermodynamic critical-field at the zero temperature. Also, we evaluate Hsh of layered superconductors in the diffusive limit as functions of the layer thicknesses (d) and identify the optimum thickness that maximizes Hsh for various materials combinations. Qualitative interpretation of Hsh(d) based on the London approximation is also discussed. The results of this work can be used to improve the performance of superconducting rf resonant cavities for particle accelerators.