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Generation of Density Matrices for Two Qubits Using Coherent and Incoherent Controls

О. В. Моржин, Alexander Pechen

2021Lobachevskii Journal of Mathematics13 citationsDOI

Abstract

Abstract In this work, we consider a pair of qubits controlled by coherent and incoherent controls. The dynamics of the two-qubit system is driven by a Gorini–Kossakowsky–Sudarchhan–Lindblad master equation where coherent control enters into the Hamiltonian and incoherent control inters into both the Hamiltonian (via Lamb shift) and the dissipative superoperator. Two classes of interaction between the system and the coherent field are considered. For this system, we analyze the control problem of generating a given target density matrix which is formulated as minimizing the Hilbert–Schmidt distance between the final density matrix and the target density matrix. Incoherent control is modeled as a sum of constant in time Gaussians with centers related with the transitions frequencies between the energy levels of the qubits. Coherent control in general formulation is considered as measurable function and in numerical experiments as piecewise constant function with constraints on magnitudes and variations. Finite-dimensional numerical optimization is performed using the dual annealing method; the corresponding results are described for some initial and target density matrices and for some set of the parameters of the control problem.

Topics & Concepts

MathematicsQubitDensity matrixHamiltonian (control theory)Dissipative systemCoherent controlPiecewiseMaster equationProbability density functionQuantum mechanicsMathematical analysisPhysicsMathematical optimizationQuantumStatisticsSpectroscopy and Quantum Chemical StudiesQuantum Information and CryptographyLaser-Matter Interactions and Applications
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