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Waves in Nonlinear Lattices: Ultrashort Optical Pulses and Bose-Einstein Condensates

Yonatan SivanSchool of Physics and Astronomy, Tel Aviv University, Tel Aviv 69978, IsraelGadi FibichSchool of Physics and Astronomy, Tel Aviv University, Tel Aviv 69978, IsraelMichael I. WeinsteinSchool of Physics and Astronomy, Tel Aviv University, Tel Aviv 69978, Israel
2006en
ABI

Abstract

The nonlinear Schrödinger equation i (partial differential)(z)A(z,x,t)+(inverted Delta)(2)(x,t)A+[1+m(kappax)]|A|2A=0 models the propagation of ultrashort laser pulses in a planar waveguide for which the Kerr nonlinearity varies along the transverse coordinate x, and also the evolution of 2D Bose-Einstein condensates in which the scattering length varies in one dimension. Stability of bound states depends on the value of kappa=beamwidth/lattice period. Wide (kappa>>1) and kappa=O(1) bound states centered at a maximum of m(x) are unstable, as they violate the slope condition. Bound states centered at a minimum of m(x) violate the spectral condition, resulting in a drift instability. Thus, a nonlinear lattice can only stabilize narrow bound states centered at a maximum of m(x). Even in that case, the stability region is so small that these bound states are "mathematically stable" but "physically unstable."

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