Peter A. Perry
Published 2012-01-11, updated 2012-09-28Version 2
We use the inverse scattering method to construct classical solutions for the Novikov-Veselov (NV) equation, solving a problem posed by Lassas, Mueller, Siltanen, and Stahel. We exploit Bogadanov's Miura-type map which transforms solutions of the modified Novikov-Veselov (mNV) equation into solutions of the NV equation. We show that the Cauchy data of conductivity type considered by Lassas, Mueller, Siltanen, and Stahel correspond precisely to the range of the Miura map, so that it suffices to study the mNV equation. We solve the mNV equation using the scattering transform associated to the defocussing Davey-Stewartson II equation.
The Novikov-Veselov Equation: Theory and Computation
Inverse scattering and global well-posedness in one and two space dimensions
Radiation Fields, Scattering and Inverse Scattering on Asymptotically Hyperbolic Manifolds
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