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Nonlinear extension of the quantum dynamical semigroup
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Nonlinear extension of the quantum dynamical semigroup
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In this paper we consider deterministic nonlinear time evolutions satisfying so called convex quasi-linearity condition. Such evolutions preserve the equivalence of ensembles and therefore are free from problems with signaling. We show that if family of linear non-trace-preserving maps satisfies the semigroup property then the generated family of convex quasi-linear operations also possesses the semigroup property. Next we generalize the Gorini-Kossakowski-Sudarshan-Lindblad type equation for the considered evolution. As examples we discuss the general qubit evolution in our model as well as an extension of the Jaynes-Cummings model. We apply our formalism to spin density matrix of a charged particle moving in the electromagnetic field as well as to flavor evolution of solar neutrinos.
Forward citations
Cited by 6 Pith papers
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Quasilinear evolution versus von Neumann selective measurement
A quasilinear nonlinear generalization of the von Neumann equation is introduced to model selective quantum measurements as continuous evolution instead of instantaneous collapse.
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Quasilinear evolution versus von Neumann selective measurement
A quasilinear evolution equation is introduced to replace von Neumann projection in selective quantum measurements, preserving ensemble equivalence and no-signaling without invoking apparatus states.
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Quantum selective measurement as a quasilinear evolution
A quasilinear continuous evolution is introduced for selective quantum measurements that converges to von Neumann projection outcomes while preserving ensemble equivalence and no-signaling.
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Quantum selective measurement as a quasilinear evolution
A quasilinear continuous evolution is introduced that reproduces the final states of von Neumann rank-one projective measurement while preserving no-signaling and ensemble equivalence.
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