Height functions on compact symmetric spaces

Abstract

We consider height functions on symmetric spaces M G/K embedded in the associated matrix Lie group G. In particular we study the relationship between the critical sets of the height function on G and its restriction to M. Also we prove that the gradient flow on M can be integrated by means of a generalized Cayley transform. This allows to obtain explicit local charts for the critical submanifolds. Finally, we discuss how to reduce the generic case to a height function whose ground hyperplane is orhogonal to a real diagonal matrix. This result requires to prove the existence of a polar decomposition adapted to the automorphism defining M. Detailed examples are given.