@phdthesis{Ciaramella2015, author = {Ciaramella, Gabriele}, title = {Exact and non-smooth control of quantum spin systems}, url = {http://nbn-resolving.de/urn:nbn:de:bvb:20-opus-118386}, school = {Universit{\"a}t W{\"u}rzburg}, year = {2015}, abstract = {An efficient and accurate computational framework for solving control problems governed by quantum spin systems is presented. Spin systems are extremely important in modern quantum technologies such as nuclear magnetic resonance spectroscopy, quantum imaging and quantum computing. In these applications, two classes of quantum control problems arise: optimal control problems and exact-controllability problems, with a bilinear con- trol structure. These models correspond to the Schr{\"o}dinger-Pauli equation, describing the time evolution of a spinor, and the Liouville-von Neumann master equation, describing the time evolution of a spinor and a density operator. This thesis focuses on quantum control problems governed by these models. An appropriate definition of the optimiza- tion objectives and of the admissible set of control functions allows to construct controls with specific properties. These properties are in general required by the physics and the technologies involved in quantum control applications. A main purpose of this work is to address non-differentiable quantum control problems. For this reason, a computational framework is developed to address optimal-control prob- lems, with possibly L1 -penalization term in the cost-functional, and exact-controllability problems. In both cases the set of admissible control functions is a subset of a Hilbert space. The bilinear control structure of the quantum model, the L1 -penalization term and the control constraints generate high non-linearities that make difficult to solve and analyse the corresponding control problems. The first part of this thesis focuses on the physical description of the spin of particles and of the magnetic resonance phenomenon. Afterwards, the controlled Schr{\"o}dinger- Pauli equation and the Liouville-von Neumann master equation are discussed. These equations, like many other controlled quantum models, can be represented by dynamical systems with a bilinear control structure. In the second part of this thesis, theoretical investigations of optimal control problems, with a possible L1 -penalization term in the objective and control constraints, are consid- ered. In particular, existence of solutions, optimality conditions, and regularity properties of the optimal controls are discussed. In order to solve these optimal control problems, semi-smooth Newton methods are developed and proved to be superlinear convergent. The main difficulty in the implementation of a Newton method for optimal control prob- lems comes from the dimension of the Jacobian operator. In a discrete form, the Jacobian is a very large matrix, and this fact makes its construction infeasible from a practical point of view. For this reason, the focus of this work is on inexact Krylov-Newton methods, that combine the Newton method with Krylov iterative solvers for linear systems, and allows to avoid the construction of the discrete Jacobian. In the third part of this thesis, two methodologies for the exact-controllability of quan- tum spin systems are presented. The first method consists of a continuation technique, while the second method is based on a particular reformulation of the exact-control prob- lem. Both these methodologies address minimum L2 -norm exact-controllability problems. In the fourth part, the thesis focuses on the numerical analysis of quantum con- trol problems. In particular, the modified Crank-Nicolson scheme as an adequate time discretization of the Schr{\"o}dinger equation is discussed, the first-discretize-then-optimize strategy is used to obtain a discrete reduced gradient formula for the differentiable part of the optimization objective, and implementation details and globalization strategies to guarantee an adequate numerical behaviour of semi-smooth Newton methods are treated. In the last part of this work, several numerical experiments are performed to vali- date the theoretical results and demonstrate the ability of the proposed computational framework to solve quantum spin control problems.}, subject = {Spinsystem}, language = {en} } @phdthesis{Kurniawan2009, author = {Kurniawan, Indra}, title = {Controllability Aspects of the Lindblad-Kossakowski Master Equation : A Lie-Theoretical Approach}, url = {http://nbn-resolving.de/urn:nbn:de:bvb:20-opus-48815}, school = {Universit{\"a}t W{\"u}rzburg}, year = {2009}, abstract = {One main task, which is considerably important in many applications in quantum control, is to explore the possibilities of steering a quantum system from an initial state to a target state. This thesis focuses on fundamental control-theoretical issues of quantum dynamics described by the Lindblad-Kossakowski master equation which arises as a bilinear control system on some underlying real vector spaces, e.g controllability aspects and the structure of reachable sets. Based on Lie-algebraic methods from nonlinear control theory, the thesis presents a unified approach to control problems of finite dimensional closed and open quantum systems. In particular, a simplified treatment for controllability of closed quantum systems as well as new accessibility results for open quantum systems are obtained. The main tools to derive the results are the well-known classifications of all matrix Lie groups which act transitively on Grassmann manifolds, and respectively, on real vector spaces without the origin. It is also shown in this thesis that accessibiity of the Lindblad-Kossakowski master equation is a generic property. Moreover, based on the theoretical accessibility results, an algorithm is developed to decide when the Lindblad-Kossakowski master equation is accessible.}, subject = {Kontrolltheorie}, language = {en} } @phdthesis{Graefe2005, author = {Gr{\"a}fe, Stefanie}, title = {Laser-control of molecular dynamics}, url = {http://nbn-resolving.de/urn:nbn:de:bvb:20-opus-13388}, school = {Universit{\"a}t W{\"u}rzburg}, year = {2005}, abstract = {In this work a new algorithm to determine quantum control fields from the instantaneous response of systems has been developed. The derived fields allow to establish a direct connection between the applied perturbation and the molecular dynamics. The principle is most easily illustrated in regarding a classical forced oscillator. A particle moving inside the respective potential is accelerated if an external field is applied acting in the same direction as its momentum (heating). In contrary, a deceleration is achieved by a field acting in the opposite direction as the momentum (cooling). Furthermore, when the particle reaches a classical turning point and then changes its direction, the sign of the field has to be changed to further drive the system in the desired way. The frequency of the field therefore is in resonance with the oscillator. This intuitively clear picture of a driven classical oscillator can be used for directing (or controlling) quantum mechanical wave packet motion. The efficiency of the instantaneous dynamics algorithm was demonstrated in treating various model problems, the population transfer in double well potentials, excitation and dissociation of selective modes, and the population transfer between electronic states. Although it was not tried to optimize the fields to gain higher yields, the control was found to be very efficient. Driving population transfer in a double well potential could be shown to take place with nearly 100\% efficiency. It was shown that selective dissociation within the electronic ground state of HOD can be performed by either maximizing a selected coordinate's differential momentum change or the energy absorption. Concerning the population transfer into excited electronic states, a direct comparison with common control algorithms as optimal control theory and genetic algorithms was accomplished using a one-dimensional representation of methyl iodide. The fields derived from the various control theories were effective in transferring population into the chosen target state but the underlying physical background of the derived optimal fields was not obvious to explain. The instantaneous dynamics algorithm allowed to establish a direct relation between the derived fields and the underlying molecular dynamics. Bound-to-bound transitions could be handled more effectively. This was demonstrated on the sodium dimer in a representation of 3 electronic states being initially in its vibronic ground state. The objective was to transfer population into a predefined excited state. Choosing the first or the second state as a target, the control fields exhibited quite different features. The pulse-structure is related to the excited state wave packet, moving in, and out of the Franck-Condon region. Changing the control objective, the derived control field performed pure electronic transitions on a fast time-scale via a two-step transition. Futhermore, orientational effects have been investigated. The overall-efficiency of the population transfer for differently oriented molecules was about 70 \% or more if applying a control field derived for a 45° orientation. Spectroscopic methods to gain information about the outcome of the control process have been investigated. It was shown that pump/probe femtosecond ionization spectroscopy is suited to monitor time-dependent molecular probability distributions. In particular, time-dependent photoelectron spectra are able to monitor the population in the various electronic states. In the last chapter a different possibility of controlling molecules was regarded by investigating molecular iodine with a setup similar to the STIRAP ("Stimulated Raman Adiabatic passage") scenario. The possibility to extend this technique to a fs-time scale was examined in theory as well as in experiments, the latter being performed by Dr. Torsten Siebert in the Kiefer group, University of W{\"u}rzburg. It was shown that off-resonant excitation with implementation of the pulses with a higher intensity of the Stokes pulse as compared to the pump pulse - describing a so-called f-STIRAP like configuration - was shown to effectively transfer population into excited ground-state vibrational levels. This was theoretically underlined by comparing the numerically exact coupling case with the adiabatic picture. The process was described to run in the vicinity of adibaticity. A new model explaining the process by the system's vector rotating around the dressed state vector will be adopted in future calculations. Altogether, a new promising algorithm to control dynamical processes based on the instantaneous response has been developed. Because the derived control fields have been shown to be very efficient in selectively influencing molecules, it is to be expected that farther reaching applications can be realized in future investigations.}, subject = {Laserstrahlung}, language = {en} }