Modified non-linear Schr\"odinger models, C Ps Td invariant N-bright solitons and infinite towers of anomalous charges

Abstract

Modifications of the non-linear Schr\"odinger model (MNLS) i ∂t (x,t) + ∂2x (x,t) - [δ Vδ ||2 ] (x,t) = 0, where ∈ C and V: R+ → R, are considered. We show that the MNLS models possess infinite towers of quasi-conservation laws for soliton-type configurations with a special complex conjugation, shifted parity and delayed time reversion ( C Ps Td) symmetry. Infinite towers of anomalous charges appear even in the standard NLS model for C Ps Td invariant N-bright solitons. The true conserved charges emerge through some kind of anomaly cancellation mechanism. A dual Riccati-type pseudo-potential formulation is introduced for a modified AKNS system (MAKNS) and infinite towers of novel anomalous conservation laws are uncovered. In addition, infinite towers of exact non-local conservation laws are uncovered in a linear system formulation. Our analytical results are supported by numerical simulations of 2-bright-soliton scatterings with potential V = - 2η2+ ε ( ||2 )2 + ε, ε ∈ R, η>0. Our numerical simulations show the elastic scattering of bright solitons for a wide range of values of the set \η, ε\ and a variety of amplitudes and relative velocities. The AKNS-type system is quite ubiquitous, and so, our results may find potential applications in several areas of non-linear physics, such as Bose-Einstein condensation, superconductivity, soliton turbulence and the triality among gauge theories, integrable models and gravity theories.