Hajo Leschke
Hajo Leschke is a German mathematical physicist and retired professor of theoretical physics at the Friedrich-Alexander-Universität Erlangen-Nürnberg. He is known for rigorous results on model systems in quantum (statistical) mechanics obtained through functional-analytic and probabilistic techniques, jointly with his students and other co-workers. His research topics include: Peierls Transition, Functional Formulations of Quantum and Stochastic Dynamics, Pekar–Fröhlich Polaron, Quantum Spin Chains, Feynman–Kac Formulas, Schrödinger Operators, Landau-Level Broadening, Lifschitz Tails, Anderson Localization, Fermionic Entanglement Entropies, Quantum Spin Glasses.
Academic education
Leschke studied physics and mathematics at the Universität Hamburg and graduated with a diploma in physics under thesis advisor Wolfgang Kundt. He received his doctorate in physics under dissertation advisor Uwe Brandt from the Universität Dortmund, where he also earned the habilitation in physics. His studies were supported by the Studienstiftung des deutschen Volkes and the Kurt-Hartwig-Siemers–Wissenschaftspreis on the recommendation of Werner Döring and of Pascual Jordan, respectively.
Career
Leschke was a research assistant to Ludwig Tewordt at the Universität Hamburg, to Uwe Brandt at the Universität Dortmund, to Herbert Wagner at the Forschungszentrum Jülich, and to Richard Bausch at the Universität Düsseldorf before he became a professor there in 1982 and at the FAU in 1983. In 1987, he was a guest professor at the University of Georgia, Athens with host David P. Landau. In 2004, he organized the workshop "Mathematics and physics of disordered systems" jointly with Michael Baake, Werner Kirsch, and Leonid A. Pastur at the Mathematisches Forschungsinstitut Oberwolfach, Germany. In 2017, he organized the workshop "Fisher–Hartwig asymptotics, Szegő expansions, and applications to statistical physics" jointly with Alexander V. Sobolev and Wolfgang Spitzer at the American Institute of Mathematics, then located in San Jose, California. From 1998 to 2011 Leschke belonged to the advisory board of the Annalen der Physik, then edited by Ulrich Eckern at the Universität Augsburg.
Notable students
Notable doctoral students of Leschke include Peter Müller and Simone Warzel. The first one is professor of mathematics at the Ludwig-Maximilians-Universität in Munich and dean of the Faculty of Mathematics, Informatics, and Statistics. The second one is professor of mathematics at the Technische Universität München in Garching near Munich.
Research achievements
Leschke's research publications listed below all refer to properties of non-relativistic quantum systems which are modeled by some Hamiltonian, that is, by some self-adjoint operator on Hilbert space representing the total energy of the system, possibly depending on random variables simulating disorder. In the publications from 2000 to 2017 the Hamiltonian is of Schrödinger type, that is, an operator for the sum of the kinetic and potential energy of "point-like" particles in Euclidean space. The two publications with Kurt Broderix extend previously known continuity properties of the corresponding one-parameter Schrödinger semi-group to rather general magnetic fields and to potential fields possibly leading to unbounded semi-groups; by suitably extending the Feynman–Kac formula and using the diamagnetic inequality. The other three publications from 2000 to 2004 consider the case of a single particle subject to a constant magnetic field and a random potential field. For a Poissonian field with positive single-impurity potential U the low-energy behavior of the integrated density of states is derived, depending on the range of U. For a Gaussian random field the first proofs are given for the existence of the density of states and of Anderson localization in multi-dimensional continuous space. The publications in 2014 and 2017 refer to the case of many non-interacting particles which obey Fermi–Dirac statistics. For the corresponding ideal Fermi gas in thermodynamic equilibrium they contain the first rigorous results on the asymptotic growth of its quantum Rényi entropies of (spatial) entanglement at arbitrary temperature. These results have served as a standard of comparison for approximate arguments and/or numerical methods to better understand the correlations in many-fermion systems with interaction. The publications in 2021 are among the first ones providing rigorous results on quantum versions of the classic Sherrington–Kirkpatrick spin-glass model. In particular, they prove for the first time the existence of a phase transition if the temperature and the strength of the "transverse" magnetic field are low enough. The publication in 2023 illuminates this phase transition's relevance to the quantum-annealing algorithm in computer science.
Selected publications since 2000
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