Optimized Double-well quantum interferometry with Gaussian squeezed-states

Abstract

A Mach-Zender interferometer with a gaussian number-difference squeezed input state can exhibit sub-shot-noise phase resolution over a large phase-interval. We obtain the optimal level of squeezing for a given phase-interval θ0 and particle number N, with the resulting phase-estimation uncertainty smoothly approaching 3.5/N as θ0 approaches 10/N, achieved with highly squeezed states near the Fock regime. We then analyze an adaptive measurement scheme which allows any phase on (-π/2,π/2) to be measured with a precision of 3.5/N requiring only a few measurements, even for very large N. We obtain an asymptotic scaling law of θ≈ (2.1+3.2((Ntotθ0)))/Ntot, resulting in a final precision of ≈ 10/Ntot. This scheme can be readily implemented in a double-well Bose-Einstein condensate system, as the optimal input states can be obtained by adiabatic manipulation of the double-well ground state.