Absence of "fractional ac Josephson effect" in superconducting junctions
Abstract
We develop a microscopic theory of ac Josephson effect in superconducting junctions described by an arbitrary scattering matrix that may include magnetic effects. In the limit of constant in time bias voltage V applied to the junction we derive a formally exact current-phase relation (CPR) that is manifestly 2π-periodic in the Josephson phase in full accordance with general principles. This our result unambiguously argues against the idea of the so-called "fractional ac Josephson effect" admitting 4π-periodic in CPR. We also demonstrate that at any non-zero V quantum dynamics of Andreev bound states becomes non-Hermitian which signals their instability, thus making any 'quasi-equilibrium' description of ac Josephson effect unreliable. We specifically address the limit of highly transparent junctions with magnetic scattering where -- along with super- and excess current terms -- at small V we also recover a non-trivial 2π-periodic dissipative current with the amplitude |V|1/3
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