Dr.-Ing. Robert Fiedler
Former Research Assistant
Dissertation
Summer Term 2020
Exercise for the lecture Introduction to Multibody Dynamics
Winter Term 2019/2020
Exercise for the lecture Linear Vibrations
Sommer Term 2019
Exercise for the lecture Introduction to Multibody Dynamics
Winter Term 2018/2019
Exercise for the lecture Non-Linear Vibrations
Sommer Term 2018
Exercise for the lecture Engineering Vibrations
Winter Term 2017/2018
Exercise for the lecture Machine- and Rotordynamics
Sommer Term 2017
Exercise for the lecture Dynamics for B.Sc. Mechatronics
Winter Term 2016/2017
Exercise for the lecture Linear Vibrations
A) Publications in Journals
- Bäuerle, S., Fiedler, R., & Hetzler, H. (2022). An Engineering Perspective on the Numerics of Quasi-Periodic Oscillations - A Comparison of two Hyper-Time Approaches based on a unified Framework. Nonlinear Dynamics. doi.org/10.1007/s11071-022-07407-5
B) Conference Reports/ Proceedings
- Fiedler, R., & Hetzler, H. (2019). An Approach to Analyze the Stability of Quasiperiodic Motions with the Method of Characteristics.Proceedings of 8th GACM Colloquium on Computational Mechanics: For Young Scientists From Academia and Industry August 28th–30th, 2019 University of Kassel, Germany. kassel university press GmbH.
- Fiedler, R., & Hetzler, H. (2019). Quasiperiodic Motions in Unbalanced Rotor Systems with simultaneous Self- or Forced Excitation.SIRM 2019 - 13th International Conference on Dynamics of Rotating Machines (Copenhagen, Denmark)
- Fiedler, R., & Hetzler, H. (2018). Numerically Approximated Lyapunov-exponents of Quasiperiodic Motions. In MATEC Web of Conferences. (Vol. 241, p. 01009). EDP Sciences.
- Fiedler, R., & Hetzler, H. (2018). Stability Analysis of Numerically approximated Quasiperiodic Motions.PAMM, 18(1), e201800189.
- Fiedler, R., & Hetzler, H. (2017). Numerical approximation of invariant manifolds for dynamical systems with simultaneous self-and forced excitation. Proceedings of the 9th European Nonlinear Dynamics Conference (Budapest).
- Fiedler, R., & Hetzler, H. (2017). On the numerical approximation of invariant manifolds for quasiperiodic motions.PAMM, 17(1), 371-372.
C) PhD Thesis
- Fiedler, R. (2021). Numerical Analysis of Invariant Manifolds Characterized by Quasi-Periodic Oscillations of Nonlinear Systems. Kassel University Press