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Statistics of Non-Conserved Observables in Lindblad Master Equations

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  • Giovanni Modanese

    (Faculty of Engineering, Free University of Bozen-Bolzano, 39100 Bolzano, Italy)

Abstract

We study the dynamics of observables that are conserved under the Hamiltonian evolution of a closed quantum system, but cease to be conserved when the system is coupled to a Markovian environment and described by a Lindblad master equation. Starting from the adjoint Lindblad equation, we derive elementary expressions for the time derivatives of the expectation value and second moment of an observable O , with particular emphasis on the case [ H , O ] = 0 but L † ( O ) ≠ 0 . These formulae provide a direct assessment of how collapse operators break Hamiltonian conservation laws and generate fluctuations of formerly conserved quantities. The discussion is illustrated by analytic examples: one-qubit amplitude damping, a two-qubit excitation-number model, a momentum-diffusion model in which the mean is conserved while the variance grows, and the Jaynes–Cummings model. The latter also shows the complementary case of a reservoir coupled through a conserved quantity, where dephasing can occur without changing the statistics of that quantity. We finally comment on the relation between Lindblad source terms and idealized wave-function reduction models in which local conservation may hold only statistically.

Suggested Citation

  • Giovanni Modanese, 2026. "Statistics of Non-Conserved Observables in Lindblad Master Equations," Stats, MDPI, vol. 9(4), pages 1-17, June.
  • Handle: RePEc:gam:jstats:v:9:y:2026:i:4:p:69-:d:1975554
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