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The Analytical Evolution Of Nls Solitons Due To The Numerical Discretization Error, Prof. Tim Marchant
The Analytical Evolution Of Nls Solitons Due To The Numerical Discretization Error, Prof. Tim Marchant
Tim Marchant
Soliton perturbation theory is used to obtain analytical solutions describing solitary wave tails or shelves, due to numerical discretization error, for soliton solutions of the nonlinear Schrodinger equation. Two important implicit numerical schemes for the nonlinear Schrodinger equation, with second-order temporal and spatial discretization errors, are considered. These are the Crank-Nicolson scheme and a scheme, due to Taha [1], based on the inverse scattering transform. The first-order correction for the solitary wave tail, or shelf, is in integral form and an explicit expression is found for large time. The shelf decays slowly, at a rate of t(-1/2), which is characteristic …