A novel hierarchy of two-family-parameter equations: Local, nonlocal, and mixed-local-nonlocal vector nonlinear Schrodinger equations

Abstract

We use two families of parameters \(εxj, εtj)\,|\,εxj,tj=1,\, j=1,2,...,n\ to first introduce a unified novel two-family-parameter system (simply called Q(n)εxn,εtn system), connecting integrable local, nonlocal, novel mixed-local-nonlocal, and other nonlocal vector nonlinear Schr\"odinger (VNLS) equations. The Q(n)εxn, εtn system with (εxj, εtj)=( 1, 1),\, j=1,2,...,n is shown to possess Lax pairs and infinite number of conservation laws. Moreover, we also analyze the PT symmetry of the Hamiltonians with self-induced potentials. The multi-linear forms and some symmetry reductions are also studied. In fact, the used two families of parameters can also be extended to the general case \(εxj, εtj) | εxj = eiθxj, εtj = eiθtj,\, θxj, θtj∈ [0, 2π),\, j=1,2,...,n\ to generate more types of nonlinear equations. The two-family-parameter idea used in this paper can also be applied to other local nonlinear evolution equations such that novel integrable and non-integrable nonlocal and mixed-local-nonlocal systems can also be found.