摘要

We consider the time-oscillating Hartree-type Schrodinger equation lu(t) + Delta u + theta(omega t) (|x|(-y) * |u|(2) where.. is a periodic function. For themean value I(theta) of theta, we show that the solution.... converges to the solution of iU(t)f + Delta U + I(theta) (|x|(-y) * |u|(2) for their local well-posedness and global well-posedness.

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