Semi-Markov processes in open quantum systems: Connections and applications in counting statistics

TL;DR

This paper establishes a formal connection between semi-Markov processes and open quantum system dynamics, introducing a generalized Feynman-Kac formula and demonstrating advantages in quantum counting statistics through a driven two-level system example.

Contribution

It introduces a novel connection between semi-Markov processes and quantum dynamics, along with a generalized Feynman-Kac formula and improved methods for quantum counting statistics.

Findings

Semi-Markov processes can model open quantum system dynamics.

The generalized Feynman-Kac formula applies to semi-Markov processes.

Enhanced quantum counting statistics methods with clear probability interpretations.

Abstract

Using the age-structure formalism, we definitely establish connections between semi-Markov processes and the dynamics of open quantum systems that satisfy the Markov quantum master equations. A generalized Feynman-Kac formula of the semi-Markov processes is also proposed. In addition to inheriting all statistical properties possessed by the piecewise deterministic processes of wavefunctions, the semi-Markov processes show their unique advantages in quantum counting statistics. Compared with the conventional method of the tilted quantum master equation, they can be applied to more general counting quantities. In particular, the terms involved in the method have precise probability meanings. We use a driven two-level quantum system to exemplify these results.