Solitary waves in the complementary generalized ABS model

Abstract

We obtain exact solutions of the nonlinear Dirac equation in 1+1 dimension of the form (x,t) =(x) - ω t where the nonlinear interactions are a combination of vector-vector and scalar-scalar interactions with the interaction Lagrangian given by LI = g2(+1)[ γμ γμ ](+1)/2 - g2q(+1)( )+1, where >0 and q>1. This is the complement of the generalization of the ABS model abs that we recently studied ak and denoted as the gABS model. We show that like the gABS model, in the complementary gABS models the solitary wave solutions also exist in the entire (, q) plane and further in both models energy of the solitary wave divided by its charge is independent of the coupling constant g. However, unlike the gABS model here all the solitary waves are single humped, any value of 0 < ω < m is allowed and further unlike the gABS model, for this complementary gABS model the solitary wave bound states exist only in case c, where c depends on the value of q. Here ω and m denote frequency and mass, respectively. We discuss the regions of stability of these solutions as a function of ω,q, using the Vakhitov-Kolokolov criterion. Finally we discuss the non-relativistic reduction of the two-parameter family of this complementary generalized ABS model to a modified nonlinear Schr\"odinger equation (NLSE) and discuss the stability of the solitary waves in the domain of validity of the modified NLSE.