Dissipation in a 2-dimensional Hilbert space: Various forms of complete positivity

Abstract

We consider the time evolution of the density matrix in a 2-dimensional complex Hilbert space. We allow for dissipation by adding to the von Neumann equation a term D[], which is of Lindblad type in order to assure complete positivity of the time evolution. We present five equivalent forms of D[]. In particular, we connect the familiar dissipation matrix L with a geometric version of D[], where L consists of a positive sum of projectors onto planes in R3. We also study the minimal number of Lindblad terms needed to describe the most general case of D[]. All proofs are worked out comprehensively, as they present at the same time a practical procedure how to determine explicitly the different forms of D[]. Finally, we perform a general discussion of the asymptotic behaviour t ∞ of the density matrix and we relate the two types of asymptotic behaviour with our geometric version of D[].

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