Univ.-Prof. Dipl.-Ing. Dr. techn. Dr. h.c.

Manfred Kaltenbacher

Manfred Kaltenbacher

Corresponding Member of the Division of Mathematics and Natural Sciences in Austria since 2017

  • Institute of Fundamentals and Theory in Electrical Engineering, Graz University of Technology

Contact:

Orcid-ID:

0000-0001-5511-8610

Research Areas:

  • Electrical Engineering, Electronics, Information Engineering
  • Theoretical electrical engineering
  • Computer simulation
  • Acoustics
  • Theoretische und Angewandte Mechanik

Profile:

CV/Website

Publications:

Website

Selected Memberships:

  • Austrian National Committee for Theoretical and Applied Mechanics
  • American Institute of Aeronautics and Astronautics
  • European Acoustic Association
  • Deutsche Gesellschaft für Akustik
  • Gesellschaft für Angewandte Mathematik und Mechanik
  • International Compumag Society

Selected Prizes:

  • Wolfgang Finkelnburg Habilitation Award
  • Richard-Büche Preis

Selected Publications:

  • Kaltenbacher, Manfred (2015) Numerical Simulation of Mechatronic Sensors and Actuators. Finite Elements for Computational Multiphysics., 3. Aufl.; Berlin: Springer (587 Seiten).
    RISENWBIB
  • Kaltenbacher, B.; Kaltenbacher, M.; Sim, I. (2013) A modified and stable version of a perfectly matched layer technique for the 3-d second order wave equation in time domain with an application to aeroacoustics. Journal of Computational Physics, Bd. 235, S. 407-422.
    RISENWBIB
  • Link, G.; Kaltenbacher, M.; Breuer, M.; Döllinger, M. (2009) A 2D Finite-Element Scheme for Fluid-Solid-Acoustic Interactions and its Application to Human Phonation. Computer Methods in Applied Mechanics and Engineering, Bd. 198 (41-44), S. 3321-3334.
    RISENWBIB
  • Kaltenbacher, M.; Landes, H.; Lerch, R. (1997) An efficient calculation scheme for the numerical simulation of coupled magnetomechanical systems. IEEE Transactions on Magnetics. Bd. 33, p. 1646-1649. https://doi.org/10.1109/20.582586.
    RISENWBIB
  • Kaltenbacher, B.; Kaltenbacher, M.; Reitzinger, S. (2003) Identification of nonlinear B–H curves based on magnetic field computations and multigrid methods for ill-posed problems. European Journal of Applied Mathematics, Bd. 14, p. 15-38. https://doi.org/10.1017/S0956792502005089.
    RISENWBIB