Rigidity of proper holomorphic maps between type-I irreducible bounded symmetric domains

Abstract

We study proper holomorphic maps between type-I irreducible bounded symmetric domains. In particular, we obtain rigidity results for such maps under certain assumptions. More precisely, let f:DIp,q DIp',q' be a proper holomorphic map, where p q 2 and q'<\2q-1,p\. Then, we show that p' p and q' q. Moreover, we prove that there exist automorphisms and of DIp,q and DIp',q' respectively, such that f= Gh for some map Gh:DIp,q DIp',q' defined by \[ Gh(Z):= bmatrix Z & 0\\ 0 & h(Z) bmatrix ∀\; Z∈ DIp,q,\] where h:DIp,q DIp'-p,q'-q is a holomorphic map.