Elliptic Integrable Systems: a Comprehensive Geometric Interpretation

Abstract

We give a geometric interpretation of all the m-th elliptic integrable systems associated to a k'-symmetric space N=G/G0 (in the sense of C.L. Terng). It turns out that we have to introduce the integer mk' defined by m1=0 and mk'= [(k'+1)/2]. Then the general problem splits into three cases : the primitive case (m < mk'), the determined case (mk'≤ m ≤ k'-1) and the underdetermined case (m ≥ k'). We prove that we have an interpretation in terms of a sigma model with a Wess-Zumino term. Moreover we prove that we have a geometric interpretation in terms of twistors. See the abstract in the paper for more precisions.