Articles | Volume 4, issue 1
https://doi.org/10.5194/ms-4-243-2013
© Author(s) 2013. This work is distributed under
the Creative Commons Attribution 3.0 License.Special issue:
A graph-theoretic approach to sparse matrix inversion for implicit differential algebraic equations
Related subject area
Subject: Dynamics and Control | Techniques and Approaches: Numerical Modeling and Analysis
Design and experiment of magnetic navigation control system based on fuzzy PID strategy
Adaptive sliding-mode control for improved vibration mitigation in civil engineering structures
Dynamic modeling of a metro vehicle considering the motor–gearbox transmission system under traction conditions
Dynamic characterization of controlled multi-channel semi-active magnetorheological fluid mount
Mech. Sci., 13, 921–931,
2022Mech. Sci., 13, 899–908,
2022Mech. Sci., 13, 603–617,
2022Mech. Sci., 12, 751–764,
2021Cited articles
Brayton, R. K., Gustavson, F. G., and Hachtel, G. D.: A new efficient algorithm for solving differential-algebraic systems using implicit backward differentiation formulas, Proc. IEEE, 60, 98–108, 1972.
Brennen, K. E., Campbell, S. L., and Petzold, L. R.: Numerical Solution of Initial-Value Problems in Differential-Algebraic Equations, Philadelphia, SIAM, 1995.
Hachtel, G. D., Brayton, R. K., and Gustavson, F. G.: The sparse tableau approach to network analysis and design, IEEE Trans. Circuit Theory, CT-18, 101–113, 1971.
Marsden, J. E. and Ratiu, T. S.: Introduction to Mechanics and Symmetry, volume 17 of Texts in Applied Mathematics, Springer-Verlag, 2nd Edn., 1999.
Murata, T., Oguni, T., and Karaki, Y.: Supercomputer-Application to Scientific Computing, Maruzen, 1985 (in Japanese).