On proper holomorphic maps between bounded symmetric domains

Abstract

We study proper holomorphic maps between bounded symmetric domains D and . In particular, when D and are of the same rank 2 such that all irreducible factors of D are of rank 2, we prove that any proper holomorphic map from D to is a totally geodesic holomorphic isometric embedding with respect to certain canonical K\"ahler metrics of D and . We also obtain some results regarding holomorphic maps F:D which map minimal disks of D properly into rank-1 characteristic symmetric subspaces of . On the other hand, we obtain new rigidity results regarding semi-product proper holomorphic maps between D and under a certain rank condition on D and .