Quantum U-statistics

Abstract

The notion of a U-statistic for an n-tuple of identical quantum systems is introduced in analogy to the classical (commutative) case: given a selfadjoint `kernel' K acting on (Cd) r with r<n, we define the symmetric operator Un= n r ΣβK(β) with K(β) being the kernel acting on the subset β of \1,… ,n\. If the systems are prepared in the i.i.d state n it is shown that the sequence of properly normalised U-statistics converges in moments to a linear combination of Hermite polynomials in canonical variables of a CCR algebra defined through the Quantum Central Limit Theorem. In the special cases of non-degenerate kernels and kernels of order 2 it is shown that the convergence holds in the stronger distribution sense. Two types of applications in quantum statistics are described: testing beyond the two simple hypotheses scenario, and quantum metrology with interacting hamiltonians.