Truncated Wigner approximation as a non-positive Kraus map
Abstract
We show that the Truncated Wigner Approximation developed in the flat phase-space is mapped into a Lindblad-type evolution with an indefinite metric in the space of linear operators. As a result, the classically evolved Wigner function corresponds to a non-positive operator R(t), which does not describe a physical state. The rate of appearance of negative eigenvalues of R(t) can be efficiently estimated. The short-time dynamics of the Kerr and second harmonic generation Hamiltonains are discussed.
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