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Prof. Dr. rer. nat. habil. Michael Stiebitz

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Veröffentlichungen am Institut für Mathematik seit 1990

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Ilchmann, Achim; Leben, Leslie; Witschel, Jonas; Worthmann, Karl;
Optimal control of differential-algebraic equations from an ordinary differential equation perspective. - In: Optimal control, applications and methods - New York, NY [u.a.] : Wiley, ISSN 1099-1514, Bd. 40 (2019), 2, S. 351-366

https://doi.org/10.1002/oca.2481
Eichfelder, Gabriele; Klamroth, Kathrin; Niebling, Julia;
Using a B&B algorithm from multiobjective optimization to solve constrained optimization problems. - In: AIP conference proceedings - Melville, NY : Inst, ISSN 15517616, Bd. 2070 (2019), S. 020028, insges. 4 S.

https://doi.org/10.1063/1.5089995
Schweser, Thomas; Stiebitz, Michael;
Partitions of multigraphs under minimum degree constraints. - In: Discrete applied mathematics - [S.l.] : Elsevier, Bd. 257 (2019), S. 269-275

https://doi.org/10.1016/j.dam.2018.10.016
Schlipf, Lena; Schmidt, Jens M.;
Simple computation of st-edge- and st-numberings from ear decompositions. - In: Information processing letters : devoted to the rapid publication of short contributions to information processing. - Amsterdam [u.a.] : Elsevier, Bd. 145 (2019), S. 58-63

https://doi.org/10.1016/j.ipl.2019.01.008
Gernandt, Hannes; Pade, Jan Philipp;
Schur reduction of trees and extremal entries of the Fiedler vector. - In: Linear algebra and its applications : LAA. - New York, NY : American Elsevier Publ, Bd. 570 (2019), S. 93-122

Gernandt, Hannes; Moalla, Nedra; Philipp, Friedrich; Selmi, Wafa; Trunk, Carsten;
Invariance of the essential spectra of operator pencils - Ilmenau : Technische Universität Ilmenau, Institut für Mathematik, 2019 - 1 Online-Ressource (15 Seiten). . - (Preprint. - M19,03)

The essential spectrum of operator pencils with bounded coefficients in a Hilbert space is studied. Sufficient conditions in terms of the operator coefficients of two pencils are derived which guarantee the same essential spectrum. This is done by exploiting a strong relation between an operator pencil and a specific linear subspace (linear relation).



https://nbn-resolving.org/urn:nbn:de:gbv:ilm1-2019200141
Kriesell, Matthias; Mohr, Samuel;
Rooted complete minors in line graphs with a Kempe coloring. - In: Graphs and combinatorics - Tokyo : Springer-Verl. Tokyo, ISSN 1435-5914, Bd. 35 (2019), 2, S. 551-557

https://doi.org/10.1007/s00373-019-02012-7
Cao, Yan; Chen, Guantao; Jing, Guangming; Stiebitz, Michael; Toft, Bjarne;
Graph edge coloring: a survey. - In: Graphs and combinatorics - Tokyo : Springer-Verl. Tokyo, ISSN 1435-5914, Bd. 35 (2019), 1, S. 33-66

https://doi.org/10.1007/s00373-018-1986-5
Leben, Florian; Trunk, Carsten;
Operator based approach to PT-symmetric problems on a wedge-shaped contour - Ilmenau : Technische Universität Ilmenau, Institut für Mathematik, 2019 - 1 Online-Ressource (23 Seiten). . - (Preprint. - M19,02)

We consider a second-order differential equation -y''(z)-(iz)^{N+2}y(z)=\lambda y(z), z\in \Gamma with an eigenvalue parameter \lambda \in C. In PT quantum mechanics z runs through a complex contour \Gamma in C, which is in general not the real line nor a real half-line. Via a parametrization we map the problem back to the real line and obtain two differential equations on [0,\infty) and on (-\infty,0]. They are coupled in zero by boundary conditions and their potentials are not real-valued. The main result is a classification of this problem along the well-known limit-point/ limit-circle scheme for complex potentials introduced by A.R. Sims 60 years ago. Moreover, we associate operators to the two half-line problems and to the full axis problem and study their spectra.



https://nbn-resolving.org/urn:nbn:de:gbv:ilm1-2019200020
Behrndt, Jussi; Schmitz, Philipp; Trunk, Carsten;
Spectral bounds for indefinite singular Sturm-Liouville operators with uniformly locally integrable potentials - Ilmenau : Technische Universität Ilmenau, Institut für Mathematik, 2019 - 1 Online-Ressource (26 Seiten). . - (Preprint. - M19,01)

The non-real spectrum of a singular indefinite Sturm-Liouville operator A=1/r (-d/dx p d/dx+q) with a sign changing weight function r consists (under suitable additional assumptions on the real coefficients 1/p,q,r in L^1_loc(R)) of isolated eigenvalues with finite algebraic multiplicity which are symmetric with respect to the real line. In this paper bounds on the absolute values and the imaginary parts of the non-real eigenvalues of A are proved for uniformly locally integrable potentials q and potentials $q in L^s(R) for some s in [1,\infty]. The bounds depend on the negative part of q, on the norm of 1/p and in an implicit way on the sign changes and zeros of the weight function.



https://nbn-resolving.org/urn:nbn:de:gbv:ilm1-2019200016