State estimation in quantum homodyne tomography with noisy data

Abstract

In the framework of noisy quantum homodyne tomography with efficiency parameter 0 < η ≤ 1, we propose two estimators of a quantum state whose density matrix elements m,n decrease like e-B(m+n)r/ 2, for fixed known B>0 and 0<r≤ 2. The first procedure estimates the matrix coefficients by a projection method on the pattern functions (that we introduce here for 0<η ≤ 1/2), the second procedure is a kernel estimator of the associated Wigner function. We compute the convergence rates of these estimators, in L2 risk.