Localized state for nonlinear disordered stark model
Abstract
In this paper, we consider the following nonlinear disordered Stark model: i∂tun+δ(un+1+un-1)+nun+vnun+ε |un|2un=0, n∈Z. By employing the diagonalization of the associated linear operators and the KAM theory for nonlinear Hamiltonian systems, we establish that for parameters δ and in a reasonable range, and for most realization of random variables v=\vn\n ∈ Z, there exist time quasi-periodic and spatially localized states that exhibit arbitrary power-law spatial decay.
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