Solutions of generalized constrained discrete KP hierarchy

Abstract

Solutions of a generalized constrained discrete KP (gcdKP) hierarchy with constraint on Lax operator Lk=(Lk)≥ m+Σi=1lqi-1mri, are invesitigated by Darboux transformations TD(f)=f[1]·· f-1 and TI(g)=(g[-1])-1·-1· g. Due to this special constraint on Lax operator, it is showed that the generating functions f and g of the corresponding Darboux transformations, can only be chosen from (adjoint) wave functions or (Lk)<m=Σi=1lqi-1mri. Then successive applications of Darboux transformations for gcdKP hierarchy are discussed. Finally based upon above, solutions of gcdKP hierarchy are obtained from L\0\= by Darboux transformations.