2024 Help me understand this report
Variational aspect and kinetic theory of locally conformal dynamics
Abstract: We present the locally conformal generalization of the Euler-Lagrange equations. We determine the dual space of the LCS Hamiltonian vector fields. Within this dual space, we formulate the Lie-Poisson equation that governs the kinetic motion of Hamiltonian systems in the context of local conformality. By expressing the Lie-Poisson dynamics in terms of density functions, we derive locally conformal Vlasov dynamics. In addition, we outline a geometric pathway that connects LCS Hamiltonian particle motion to local…
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2025
2025
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