6.946J Classical Mechanics: A Computational Approach
Classical mechanics in a computational framework, Lagrangian formulation, action, variational principles, and Hamilton's principle. Conserved quantities, Hamiltonian formulation, surfaces of section, chaos, and Liouville's theorem. Poincar? integral invariants, Poincar?-Birkhoff and KAM theorems. Invariant curves and cantori. Nonlinear resonances, resonance overlap and transition to chaos. Symplectic integration. Adiabatic invariants. Applications to simple physical systems and solar system dynamics. Extensive use of computation to capture methods, for simulation, and for symbolic analysis. Programming experience required. Students taking the graduate version complete additional assignments.
This class has 18.03 as a prerequisite.
This class counts for a total of 12 credits. This is a graduate-level class.
You can find more information at the Classical Mechanics: A Computational Approach site.
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