A note on "Problem of eigenvalues of stochastic Hamiltonian systems with boundary conditions"

Abstract

The eigenvalue problem of stochastic Hamiltonian systems with boundary conditions was studied by Peng peng in 2000. For one-dimensional case, denoting by \λn\n=1∞ all the eigenvalues of such an eigenvalue problem, Peng proved that λn +∞. In this short note, we prove that the growth order of λn is the same as n2 as n +∞. Apart from the interesting of its own, by this result, the statistic period of solutions of FBSDEs can be estimated directly by corresponding coefficients and time duration.

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