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Institute of Mathematics

Bartsch Jan, Dr.

Dr. Jan Bartsch

Dr. Jan Bartsch

Lecturer
Institute of Mathematics
Emil-Fischer-Straße 40
97074 Würzburg
Building: 40 (Mathematik Ost)
Room: 00.012
Phone: +49 931 31-80733
Porträt Jan Bartsch

Summer semester 2025

  • Mathematics for Computer Science 2
  • Programming course for Students of Mathematics and other subjects


Winter semester 2024/2025

  • Programming course for Students of Mathematics and other subjects

  • Optimal control of partial differential equations
  • Monte Carlo methods for solving kinetic models
  • Numerical analysis of hyperbolic differential equations
  • Stochastic differential equations

  • C/C++
  • Python
  • Matlab
  • Java SE/EE
  • ParaView

  • since 2024: Research associate at the Institute of Mathematics, University of Würzburg

  • 2021 - 2024: Postdoctoral researcher at the University of Konstanz within SFB1432 "Fluctuations and Nonlinearities in Classical and Quantum Matter beyond Equilibrium" in subproject "Numerical optimization methods for the identification and control of fluctuating systems", Principle Investigator: Stefan Volkwein

  • 2018 - 2021: PhD at the Chair of Scientific Computing at the University of Würzburg, Dissertation title: "Theoretical and Numerical Investigation of Optimal Control Problems Governed by Kinetic Models", Supervisor: Alfio Borzi

  • 2016 - 2018: Master's studies at the University of Würzburg (Mathematics), Thesis title: "Optimal Control Problems Governed by Liouville Models - Mathematical Analysis and Implementation"

  • 2013 - 2016: Bachelor's studies at the University of Würzburg (Computational Mathematics), Thesis title: "Optimal Control of Androgen Suppression of Prostate Cancer"

Publications

  • 1.
    Adjoint-based optimal control of jump-diffusion processes
    Bartsch, J., Borzì, A., Ciaramella, G., Reichle, J.
    preprint arXiv, submitted to Kinetic and Related Models (2025)
  • 1.
    Reconstructing the system coefficients for coupled harmonic oscillators
    Bartsch, J., Barakat, A. A., Buchwald, S., Ciaramella, G., Volkwein, S., Weig, E. M.
    preprint arXiv:2412.07301 (2024)

  • 1.
    Reconstruction of unknown nonlinear operators in semilinear elliptic models using optimal inputs
    Bartsch, J., Buchwald, S., Ciaramella, G., Volkwein, S.
    Math. Control Relat. Fields (2024)
  • 1.
    Adjoint-based calibration of nonlinear stochastic differential equations
    Bartsch, J., Denk, R., Volkwein, S.
    Appl. Math. Optim. 90, Paper No. 50, 54 (2024)
  • 1.
    Controlling a Vlasov-Poisson Plasma by a Particle-in-Cell Method Based on a Monte Carlo Framework.
    Bartsch, J., Knopf, P., Scheurer, S., Weber, J.
    SIAM J. Control. Optim. 62, 1977-2011 (2024)
  • 1.
    On the stabilization of a kinetic model by feedback-like control fields in a Monte Carlo framework
    Bartsch, J., Borzì, A.
    Kinet. Relat. Models (2024)
  • 1.
    MOCOKI: A Monte Carlo approach for optimal control in the force of a linear kinetic model
    Bartsch, J., Borzì, A.
    Comput. Phys. Commun. 266, 108030 (2021)
  • 1.
    Optimal control of the Keilson-Storer master equation in a Monte Carlo framework
    Bartsch, J., Nastasi, G., Borzì, A.
    J. Comput. Theor. Transp. 50, 454-482 (2021)
  • 1.
    A numerical investigation of Brockett’s ensemble optimal control problems
    Bartsch, J., Borzì, A., Fanelli, F., Roy, S.
    Numer. Math. 149, 1-42 (2021)
  • 1.
    A theoretical investigation of Brockett’s ensemble optimal control problems
    Bartsch, J., Borzì, A., Fanelli, F., Roy, S.
    Calc. Var. Partial Differential Equations 58, Paper No. 162, 34 (2019)
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