Existence of global solutions to the nonlocal Schr\"odinger equation on the line
Abstract
In this paper, we address the existence of global solutions to the Cauchy problem for the integrable nonlocal nonlinear Schr\"odinger (nonlocal NLS) equation with the initial data q0(x)∈ H1,1() with the L1() small-norm assumption. We rigorously show that the spectral problem for the nonlocal NLS equation admits no eigenvalues or resonances, as well as Zhou vanishing lemma is effective under the L1() small-norm assumption. With inverse scattering theory and the Riemann-Hilbert approach, we rigorously establish the bijectivity and Lipschitz continuous of the direct and inverse scattering map from the initial data to reflection coefficients.By using reconstruction formula and the Plemelj projection estimates of reflection coefficients,we further obtain the existence of the local solution and the priori estimates, which assure the existence of the global solution to the Cauchy problem for the nonlocal NLS equation.
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