A Riemann-Hilbert Problem for an Energy Dependent Schr\"odinger Operator
Abstract
consider an inverse scattering problem for Schr\"odinger operators with energy dependent potentials. The inverse problem is formulated as a Riemann-Hilbert problem on a Riemann surface. A vanishing lemma is proved for two distinct symmetry classes. As an application we prove global existence theorems for the two distinct systems of partial differential equations ut+(u2/2+w)x=0, wt uxxx+(uw)x=0 for suitably restricted, complementary classes of initial data.
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