On local holomorphic maps preserving invariant (p,p)-forms between bounded symmetric domains

Abstract

Let D, 1, ..., m be irreducible bounded symmetric domains. We study local holomorphic maps from D into 1 ×... m preserving the invariant (p, p)-forms induced from the normalized Bergman metrics up to conformal constants. We show that the local holomorphic maps extends to algebraic maps in the rank one case for any p and in the rank at least two case for certain sufficiently large p. The total geodesy thus follows if D=Bn, i = BNi for any p or if D=1 =...=m with rank(D)≥ 2 and p sufficiently large. As a consequence, the algebraic correspondence between quasi-projective varieties D / preserving invariant (p, p)-forms is modular, where is a torsion free, discrete, finite co-volume subgroup of Aut(D). This solves partially a problem raised by Mok.