Minimal P-symmetric period problem of first-order autonomous Hamiltonian Systems
Abstract
Let P∈ Sp(2n) satisfying Pk=I2n, we consider the minimal P-symmetric period problem of the autonomous nonlinear Hamiltonian system equation* x(t) = JH(x(t)). equation* For some symplectic matrices P, we show that for any τ>0 the above Hamiltonian system possesses a kτ periodic solution x with kτ being its minimal P-symmetric period provided H satisfies the Rabinowitz's conditions on the minimal period conjecture, together with that H is convex and H(Px)=H(x).
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