The law of large numbers for discrete generalized quantum channels

Abstract

We consider random linear operators L(Tp, Tp) acting in a p-th Schatten class Tp in a separable Hilbert space H for some 1 ≤slant p < ∞. Such a superoperator is called a pre-channel since it is an extension of a quantum channel to a wider class of operators without requirements of trace-preserving and positivity. Instead of the sum of i.i.d. variables there may be considered the composition of random semigroups eAi t/n in the Banach space Tp. The law of large numbers is known in the case p=2 in the form of the usual law of large numbers for random operators in a Hilbert space. We obtain the law of large numbers for the case 1≤slant p ≤slant 2.

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