Tensor power of dynamical maps and P- vs. CP-divisibility

Abstract

The are several non-equivalent notions of Markovian quantum evolution. In this paper we show that the one based on the so-called CP-divisibility of the corresponding dynamical map enjoys the following stability property: the dynamical map t is CP-divisible iff the second tensor power tt is CP-divisible as well. Moreover, the P-divisibility of the map tt is equivalent to the CP-divisibility of the map t. Interestingly, the latter property is no longer true if we replace the P-divisibility of tt by simple positivity and the CP-divisibility of t by complete positivity. That is, unlike when t has a time-independent generator, positivity of tt does not imply complete positivity of t.