Computational Methods for Nonlinear Dynamical Systems: Theory and Applications in Aerospace Engineering
Autor Xuechuan Wang, Xiaokui Yue, Honghua Dai, Haoyang Feng, Satya N. Atlurien Limba Engleză Paperback – 29 sep 2022
In addition, new high-performance methods are proposed, such as time-domain collocation and local variational iteration. The book summarizes and develops computational methods for strongly nonlinear dynamic systems and considers the practical application of the methods within aerospace engineering.
- Presents global methods for solving periodic nonlinear dynamical behaviors
- Gives local methods for solving transient nonlinear responses
- Outlines computational methods for linear, nonlinear, ordinary and partial differential equations
- Emphasizes the development of accurate and efficient numerical methods that can be used in real-world missions
- Reveals practical applications of methods through orbital mechanics and structural dynamics
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Specificații
ISBN-13: 9780323991131
ISBN-10: 0323991130
Pagini: 240
Dimensiuni: 191 x 235 x 17 mm
Greutate: 0.42 kg
Editura: ELSEVIER SCIENCE
ISBN-10: 0323991130
Pagini: 240
Dimensiuni: 191 x 235 x 17 mm
Greutate: 0.42 kg
Editura: ELSEVIER SCIENCE
Public țintă
Senior undergraduates, postgraduates, researchers and engineers who are interested in nonlinear computational methods.Cuprins
1. Introduction
2. Harmonic Balance Method and Time Domain Collocation Method
3. Dealiasing for Harmonic Balance and Time Domain Collocation Methods
4. Application of Time Domain Collocation in Formation Flying of Satellites
5. Local Variational Iteration Method
6. Collocation of Local Variational Iteration Method
7. Application of Local Variational Iteration Method in Orbital Mechanics
8. Applications of Local Variational Iteration Method in Structural Dynamics
2. Harmonic Balance Method and Time Domain Collocation Method
3. Dealiasing for Harmonic Balance and Time Domain Collocation Methods
4. Application of Time Domain Collocation in Formation Flying of Satellites
5. Local Variational Iteration Method
6. Collocation of Local Variational Iteration Method
7. Application of Local Variational Iteration Method in Orbital Mechanics
8. Applications of Local Variational Iteration Method in Structural Dynamics