Collective Symplectic Integrators on S₂^N times T^*mathbb{R}^M
classification
🧮 math.NA
cond-mat.mtrl-scics.NAmath.DG
keywords
hamiltonianstudiedsymplectictimesalgebraiccollectiveconditionsderived
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A novel symplectic integrator for Hamiltonian equations on $S_2^n \times T^{\ast} \RR^m$ is developed and studied. Partitioned Runge--Kutta methods for Hamiltonian systems on products of Hamiltionian manifolds are studied, specifically, algebraic conditions for their symplecticity are derived.
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Cited by 1 Pith paper
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On the Symplectic Propagation of the Spin-MInt Algorithm for Non-Adiabatic Quantum Dynamics
The Spin-MInt algorithm is proven symplectic for general K electronic states via explicit verification of the condition MJM^T = J on the coadjoint orbit of the su(K) Lie-Poisson algebra.
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