Josephson junction dynamics in the presence of 2π- and 4π-periodic supercurrents

Abstract

We investigate theoretically the dynamics of a Josephson junction in the framework of the RSJ model. We consider a junction that hosts two supercurrrent contributions: a 2π- and a 4π-periodic in phase, with intensities I2π and I4π respectively. We study the size of the Shapiro steps as a function of the ratio of the intensity of the mentioned contributions, i.e. I4π/I2π. We provide detailed explanations where to expect clear signatures of the presence of the 4π-periodic contribution as a function of the external parameters: the intensity AC-bias Iac and frequency ωac. On the one hand, in the low AC-intensity regime (where Iac is much smaller than the critical current, Ic), we find that the non-linear dynamics of the junction allows the observation of only even Shapiro steps even in the unfavorable situation where I4π/I2π 1. On the other hand, in the opposite limit (Iac Ic), even and odd Shapiro steps are present. Nevertheless, even in this regime, we find signatures of the 4π-supercurrent in the beating pattern of the even step sizes as a function of Iac.