6533b7d0fe1ef96bd125add9

RESEARCH PRODUCT

Monotonically convergent optimal control theory of quantum systems with spectral constraints on the control field

Gabriel TuriniciR. TehiniM. LapertDominique Sugny

subject

PhysicsQuantum Physics32.80.Qk 37.10.Vz 78.20.Bh010304 chemical physicsField (physics)[ PHYS.QPHY ] Physics [physics]/Quantum Physics [quant-ph]FOS: Physical sciencesMonotonic functionOptimal controlTopology01 natural sciencesAtomic and Molecular Physics and Optics[PHYS.QPHY]Physics [physics]/Quantum Physics [quant-ph]Band-pass filter0103 physical sciencesStandard algorithms010306 general physicsLinear combinationControl (linguistics)Quantum Physics (quant-ph)Quantum

description

We propose a new monotonically convergent algorithm which can enforce spectral constraints on the control field (and extends to arbitrary filters). The procedure differs from standard algorithms in that at each iteration the control field is taken as a linear combination of the control field (computed by the standard algorithm) and the filtered field. The parameter of the linear combination is chosen to respect the monotonic behavior of the algorithm and to be as close to the filtered field as possible. We test the efficiency of this method on molecular alignment. Using band-pass filters, we show how to select particular rotational transitions to reach high alignment efficiency. We also consider spectral constraints corresponding to experimental conditions using pulse shaping techniques. We determine an optimal solution that could be implemented experimentally with this technique.

yearjournalcountryeditionlanguage
2009-01-01
https://dx.doi.org/10.48550/arxiv.0906.1051