Integration algorithms and classical mechanics /
Guardado en:
| Otros Autores: | , , |
|---|---|
| Formato: | Libro |
| Idioma: | English |
| Publicado: |
Providence, R.I. :
American Mathematical Society,
c1996.
|
| Series: | Fields Institute communications,
v. 10 |
| Etiquetas: |
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Tabla de Contenidos:
- The work of Juan Carlos Simo on integration algorithms in mechanics
- F. Armero and J. C. Simo, Formulation of a new class of fractional-step methods for the incompressible MHD equations that retains the long-term dissipativity of the continuum dynamical system
- E. Barth and B. Leimkuhler, Symplectic methods for conservative multibody systems
- Paul J. Channell and Filippo R. Neri, An introduction to symplectic integrators
- Alex J. Dragt and Dan T. Abell, Symplectic maps and computation of orbits in particle accelerators
- David J. D. Earn and A. J. Lichtenberg, Arnold diffusion in symplectic lattice maps
- Mikko Kaasalainen and James Binney, Integrable Hamiltonians from close approximations to invariant tori
- P.-V. Koseleff, Exhaustive search of symplectic integrators using computer algebra
- D. Lewis and J. C. Simo, Conserving algorithms for the $N$-dimensional rigid body
- Robert I. McLachlan, More on symplectic correctors
- Robert I. McLachlan and Clint Scovel, A survey of open problems in symplectic integration
- Sebastian Reich, Symplectic integrators for systems of rigid bodies
- J. M. Sanz-Serna, Backward error analysis of symplectic integrators
- T. J. Stuchi and R. Vieira-Martins, Numerical determination of caustics and their bifurcations
- J. Wisdom, M. Holman and J. Touma, Symplectic correctors.