On Third-Order Evolution Systems Describing Pseudo-Spherical or Spherical Surfaces
Abstract
We consider a class of third-order evolution equations of the form equation* \ arrayl ut=F(x,t,u,ux,uxx,uxxx,v,vx,vxx,vxxx), vt=G(x,t,u,ux,uxx,uxxx,v,vx,vxx,vxxx), array . equation* describing pseudos-pherical (pss) or spherical surfaces (ss), meaning that, their generic solutions (u(x,t), v(x,t)) provide metrics, with coordinates (x,t), on open subsets of the plane, with constant curvature K=-1 or K=1. These systems can be described as the integrability conditions of g-valued linear problems, with g=sl(2,) or g=su(2), when K=-1, K=1, respectively. We obtain characterization and also classification results. Applications of these results provide new examples and new families of such systems, which also contain systems of coupled KdV and mKdV-type equations and nonlinear Schr\"odinger equations. Additionally, this theory is applied to derive a B\"acklund transformation for the coupled KdV system.
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