Variational attraction of the KAM torus for the conformally symplectic system
Abstract
For the conformally symplectic system \[ \ aligned q&=Hp(q,p),(q,p)∈ T*Tn\\ p&=-Hq(q,p)-λ p, λ>0 aligned . \] with a positive definite Hamiltonian, we discuss the variational significance of invariant Lagrangian graphs and explain how the KAM torus impacts the W1,∞-convergence speed of the Lax-Oleinik semigroup.
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