Three-magnon problem for exactly rung-dimerized spin ladders: from general outlook to Bethe Ansatze

Abstract

Three-magnon problem for exactly rung-dimerized spin ladder is brought up separately at all total spin sectors. At first a special duality transformation of the Schr odinger equation is found within general outlook. Then the problem is treated within Coordinate Bethe Ansatze. A straightforward approach is developed to obtain pure scattering states. At values S=0 and S=3 of total spin the Schr odinger equation has the form inherent in the XXZ chain. For S=1,2 solvability holds only in five previously found completely integrable cases. Nevertheless a partial S=1 Bethe solution always exists even for general non integrable model. Pure scattering states for all total spin sectors are presented explicitly.