Lifetime renormalization of weakly anharmonic superconducting qubits: I. Role of number non-conserving terms

TL;DR

This paper develops an effective master equation approach with power-dependent parameters to better model the relaxation dynamics of weakly anharmonic superconducting qubits, accounting for number non-conserving effects and environmental influences.

Contribution

It introduces a unitary transformation method to derive analytic expressions for renormalized dissipative parameters in superconducting qubits, considering non-conserving nonlinearities and environmental coupling.

Findings

Renormalization of dissipative parameters due to non-conserving nonlinearities.

Analytic expressions for relaxation and Purcell decay rates.

Effective master equation with drive-power dependence.

Abstract

The dynamics of a weakly anharmonic superconducting qubit in a complex electromagnetic environment is generally well-described by an effective multimode Kerr Hamiltonian at sufficiently weak excitation. This Hamiltonian can be embedded in a master equation with losses determined by the details of the electromagnetic environment. Recent experiments indicate, however, that when a superconducting circuit is driven with microwave signals the observed relaxation rates appear to be substantially different from expectations based on the electromagnetic environment of the qubit alone. This issue is a limiting factor in the optimization of superconducting qubit readout schemes. We claim here that an effective master equation with drive-power dependent parameters is an efficient approach to model such quantum dynamics. In this sequence of papers, we derive effective master equations, whose parameters exhibit nonlinear dependence on the excitation level of the circuit as well as the electromagnetic environment of the qubit. We show that the number non-conserving terms in the qubit nonlinearity generally lead to a renormalization of dissipative parameters of the effective master equation, while the number conserving terms give rise to a renormalization of the system frequencies. Here, in Part I, we consider the excitation-relaxation dynamics of a transmon qubit that is prepared in a certain initial state, but is not driven otherwise. A unitary transformation technique is introduced to study the renormalization of i) qubit relaxation due to coupling to a generic bath and ii) Purcell decay. Analytic expressions are provided for the dependence of the nonlinear dissipative terms on the details of the electromagnetic environment of the qubit. The perturbation technique based on unitary transformations developed here is generalized to the continuously driven case in Part II.