The Novikov-Veselov Equation:Theory and Computation

Abstract: Abstract. We review recent progress in theory and computation for the Novikov-Veselov (NV) equation with potentials decaying at infinity, focusing mainly on the zero-energy case. The inverse scattering method for the zeroenergy NV equation is presented in the context of Manakov triples, treating initial data of conductivity type rigorously. Special closed-form solutions are presented, including multisolitons, ring solitons, and breathers. The computational inverse scattering method is used to study zero-energy… Show more

“…We refer to [19] for a systematic study of the dispersive properties of general third order (local) operators in twodimensions. We refer to the excellent survey [54] for a rather complete account of what is known in this case and which comprises some interesting numerics and a rich bibliography.…”

“…The Novikov-Veselov equation with zero energy has a global solution for critical and subcritical initial data, but its solution may blow up in finite time for supercritical initial data. 12 We refer to [54] for some partial results toward its resolution.…”

IST Versus PDE: A Comparative Study

“…We refer to [19] for a systematic study of the dispersive properties of general third order (local) operators in twodimensions. We refer to the excellent survey [54] for a rather complete account of what is known in this case and which comprises some interesting numerics and a rich bibliography.…”

“…The Novikov-Veselov equation with zero energy has a global solution for critical and subcritical initial data, but its solution may blow up in finite time for supercritical initial data. 12 We refer to [54] for some partial results toward its resolution.…”

IST Versus PDE: A Comparative Study

“…In fact, a huge and ever-growing body of works related to the study of NV equations has been established (see, for example, Refs. [15][16][17][18] for a rather extensive review of a recent literature on the subject). In particular, a lot of spotlight has been focused on the solutions of (14) and (15).…”

“…Many articles were dedicated to unusual and fascinating properties of the multi-dimensional solutions, including those for seemingly ordinary flat waves. In particular, in [24] it has been shown that plane wave soliton solutions of NV equation are not stable for transverse perturbations; the paper [18] demonstrates that NV equation permits such interesting solutions as multi-solitons, ring solitons, and the breathers; while the authors of [25] construct a Mach-type soliton of the NV equation. One of the most effective mathematical tools for studying the NV equation is the inverse scattering method.…”

The Cauchy Problem for the Generalized Hyperbolic Novikov–Veselov Equation via the Moutard Symmetries

“…It is a nonlinear evolution equation generalizing the celebrated Korteweg-de Vries (KdV) equation into dimension (2+1). There has been significant recent progress in linearizing the NV equation using inverse scattering methods, see [38,37,44,42,14].…”

Nonlinear Fourier analysis for discontinuous conductivities: Computational results