Jonas Kappauf, M.Sc.

Ehemaliger Wissenschaftlicher Mitarbeiter

Anschrift: Carl Zeiss SMT GmbH

Sommersemester 2023
Übung zur Vorlesung Technische Schwingungslehre

Wintersemester 2022/2023
Übung zur Vorlesung Lineare Schwingungen

Wintersemester 2021/2022
Übung zur Vorlesung Lineare Schwingungen

Sommersemester 2021
Übung zur Vorlesung Dynamik (für B.Sc. Mechatronik)
Übung zur Vorlesung Einführung in die Mehrkörperdynamik

Wintersemester 2020/2021
Übung zur Vorlesung Maschinen- und Rotordynamik

Sommersemester 2020
Übung zur Vorlesung Dynamik (für B.Sc. Mechatronik)

Wintersemester 2019/2020
Übung zur Vorlesung Nichtlineare Schwingungen

Sommersemester 2019
Übung zur Vorlesung Technische Schwingungslehre

Wintersemester 2018/2019
Übung zur Vorlesung Maschinen- und Rotordynamik

Sommersemester 2018
Übung zur Vorlesung Einführung in die Mehrkörperdynamik

A) Veröffentlichungen in Zeitschriften

  • J. Kappauf, S. Bäuerle und H. Hetzler, "A Combined FD-HB Approximation Method for Steady-State Vibrations in Large Dynamical Systems with Localised Nonlinearities," Computational Mechanics, vol. 70, S. 1241-1256, 2022.

  • S. Huemer-Kals, J. Kappauf, M. Zacharczuk, H. Hetzler, K. Häsler und P. Fischer, "Advancements on Bifurcation Behavior and Operational Deflection Shapes of Disk Brake Creep Groan," Journal of Sound and Vibration, vol. 534: e116978, 2022.

  • L. Woiwode, N. N. Balaji, J. Kappauf, F. Tubita, L. Guillot, C. Vergez, B. Cochelin, A. Grolet und M. Krack, "Comparison of two algorithms for Harmonic Balance and path continuation," Mechanical Systems and Signal Processing, vol. 136: e106503, 2020.

B) Tagungsberichte/ Proceedings

  • J. Kappauf and H. Hetzler, "A Hybrid Approximation Method for the analysis of periodic solutions of large-scale dynamical systems," Proceedings of ISMA 2022, accepted - tbp.
  • J. Kappauf und H. Hetzler, "On A Hybrid Approximation Concept for Self-Excited Periodic Oscillations of Large-Scale Dynamical Systems," Proceedings of Applied Mathematics and Mechanics, vol. 21: e202100143, 2021.
  • J. Kappauf und H. Hetzler, "On A Hybrid Concept for Approximating Self-Excited PeriodicOscillations of Large-Scaled Dynamical Systems," Proceedings of Applied Mathematics and Mechanics, vol. 20: e202000329, 2020.
  • J. Kappauf und H. Hetzler, "Initialization of the continuation of stick-slip vibrations for a two dof friction oscillator," Proceedings of 8th GACM Colloquium on Computational Mechanics, vol. 8, S. 87-89, 2019.
  • J. Kappauf und H. Hetzler, "Bifurcations and limit cycles due to self-excitation in nonlinear systems with joint friction: Initialization of isolated solution branches via homotopy methods," Proceedings of Applied Mathematics and Mechanics, vol. 19: e201900412, 2019.
  • J. Kappauf und H. Hetzler, "Bifurcations and limit cycles due to self-excitation in nonlinear systems with joint friction: Phenomena and approximation schemes," Proceedings of ISMA 2018, S. 3343-3352, 2018.
  • J. Kappauf und H. Hetzler, "A comparison of methods for approximating periodic limit cycles in nonlinear systems with joint friction," Proceedings of Applied Mathematics and Mechanics, vol. 18: e20180034, 2018.