Totally geodesic discs in bounded symmetric domains

Abstract

In this paper, we characterize C2-smooth totally geodesic isometric embeddings f ' between bounded symmetric domains and ' which extend C1-smoothly over some open subset in the Shilov boundaries and have nontrivial normal derivatives on it. In particular, if is irreducible, there exist totally geodesic bounded symmetric subdomains 1 and 2 of ' such that f = (f1, f2) maps into 1× 2⊂ where f1 is holomorphic and f2 is anti-holomorphic totally geodesic isometric embeddings. If rank(')<2rank(), then either f or f is a standard holomorphic embedding.