Path integral approach to the quantum fidelity amplitude

Abstract: The Loschmidt echo is a measure of quantum irreversibility and is determined by the fidelity amplitude of an imperfect time-reversal protocol. Fidelity amplitude plays an important role both in the foundations of quantum mechanics and in its applications, such as time-resolved electronic spectroscopy. We derive an exact path integral formula for the fidelity amplitude and use it to obtain a series of increasingly accurate semiclassical approximations by truncating an exact expansion of the path integral expone… Show more

“…Using the expression (6.14) for the operator O φ we compute directly the two-point function 20) whereas for the expectation value ⟨Ω O φ (τ ) Ω⟩ we obtain…”

Quantum information metric and Berry curvature from a Lagrangian approach

“…Using the expression (6.14) for the operator O φ we compute directly the two-point function 20) whereas for the expectation value ⟨Ω O φ (τ ) Ω⟩ we obtain…”

Quantum information metric and Berry curvature from a Lagrangian approach

“…The Quantum Fidelity is an essential tool to predict quantum phase transitions [17,16] and the Fidelity susceptibility [16], corresponds essentially to the QIM. Some approaches to these geometrical structures involve the path integral for computing the Quantum Fidelity [18], the QIM [19,20] and the QGT [21].…”

The quantum geometric tensor from generating functions

“…A semiclassical formulation of the Loschmidt echo that allows one to overcome these difficulties is the so-called dephasing representation. The contribution of Vaníček & Cohen [ 14 ] provides a rigorous derivation of the dephasing representation based on the path integral formalism. The authors also construct higher order approximations of the quantum fidelity that resolve several shortcomings of the standard dephasing representation.…”

Loschmidt echo and time reversal in complex systems