Harmonic maps of finite uniton number into inner symmetric spaces via based normalized extended frames

Abstract

In this paper, we develop a loop group description of harmonic maps F: M → G/K of finite uniton number, from a Riemann surface M, compact or non-compact, into inner symmetric spaces of compact or non-compact type. As a main result we show that the theory of [Burstall-Guest, Math Ann, 97], largely based on Bruhat cells, can be transformed into the DPW theory which is mainly based on Birkhoff cells. Moreover, it turns out that the potentials constructed in [Burstall-Guest, Math Ann, 97], mainly see section 5, can be used to carry out the DPW procedure which uses essentially the fixed initial condition e at a fixed base point z0. This extends work of Uhlenbeck, Segal, and Burstall-Guest to non-compact inner symmetric spaces as target spaces (as a consequence of a "Duality Theorem"). It also permits to say that there is a 1-1-relation between finite uniton number harmonic maps and normalized potentials of a very specific and very controllable type. In particular, we prove that every harmonic map of finite uniton type from any (compact or non-compact) Riemann surface into any compact or non-compact inner symmetric space has a normalized potential taking values in some nilpotent Lie subalgebra, as well as a normalized frame with initial condition identity. This provides a straightforward way to construct all such harmonic maps. We also illustrate the above results exclusively by Willmore surfaces, since this problem is motivated by the study of Willmore two--spheres in spheres.