Neumann-Rosochatius system for strings in ABJ Model

Abstract

Neumann-Rosochatius system is a well known one dimensional integrable system. We study the rotating and pulsating string in AdS4 × CP3 with a BNS holonomy turned on over CP1 ⊂ CP3, or the so called Aharony-Bergman-Jafferis (ABJ) background. We observe that the string equations of motion in both cases are integrable and the Lagrangians reduce to a form similar to that of deformed Neuman-Rosochatius system. We find out the scaling relations among various conserved charges and comment on the finite size effect for the dyonic giant magnons on Rt× CP3 with two angular momenta. For the pulsating string we derive the energy as function of oscillation number and angular momenta along CP3.