Effect of higher-order nonlinearities on amplification and squeezing in Josephson parametric amplifiers

TL;DR

This paper investigates how higher-order nonlinearities in Josephson parametric amplifiers limit their gain, squeezing, and quantum efficiency, revealing non-Gaussian effects and phase-dependent performance reductions.

Contribution

It derives leading nonlinear corrections for various pumping schemes and demonstrates their impact on amplifier performance and output field properties.

Findings

Higher-order nonlinearities reduce squeezing and quantum efficiency.

Kerr-type corrections cause phase-dependent performance degradation.

Non-Gaussian effects increase with gain and nonlinearity.

Abstract

Single-mode Josephson junction-based parametric amplifiers are often modeled as perfect amplifiers and squeezers. We show that, in practice, the gain, quantum efficiency, and output field squeezing of these devices are limited by usually neglected higher-order corrections to the idealized model. To arrive at this result, we derive the leading corrections to the lumped-element Josephson parametric amplifier of three common pumping schemes: monochromatic current pump, bichromatic current pump, and monochromatic flux pump. We show that the leading correction for the last two schemes is a single Kerr-type quartic term, while the first scheme contains additional cubic terms. In all cases, we find that the corrections are detrimental to squeezing. In addition, we show that the Kerr correction leads to a strongly phase-dependent reduction of the quantum efficiency of a phase-sensitive measurement. Finally, we quantify the departure from ideal Gaussian character of the filtered output field from numerical calculation of third and fourth order cumulants. Our results show that, while a Gaussian output field is expected for an ideal Josephson parametric amplifier, higher-order corrections lead to non-Gaussian effects which increase with both gain and nonlinearity strength. This theoretical study is complemented by experimental characterization of the output field of a flux-driven Josephson parametric amplifier. In addition to a measurement of the squeezing level of the filtered output field, the Husimi Q-function of the output field is imaged by the use of a deconvolution technique and compared to numerical results. This work establishes nonlinear corrections to the standard degenerate parametric amplifier model as an important contribution to Josephson parametric amplifier's squeezing and noise performance.