On local holomorphic maps between K\"ahler manifolds preserving (p,p)-forms
Abstract
We study local holomorphic maps between K\"ahler manifolds preserving (p,p)-forms. In this direction, we prove that any such local holomorphic map F is a holomorphic isometry up to a scalar constant provided that p is strictly less than the complex dimension of the domain of F. We then study local holomorphic maps between finite dimensional complex space forms preserving invariant (p,p)-forms. It was proved by Calabi that there does not exist a local holomorphic isometry between complex space forms M and N provided that M and N are of different types. In this article, we generalize this result to local holomorphic maps between complex space forms M and N preserving invariant (p,p)-forms whenever M and N are of different types except for the case where the universal covers of M, N are biholomorphic to Cm, Pn, respectively and 2 p=m<n. We also obtain some results in more general settings, including the study on indefinite K\"ahler manifolds and relatives for K\"ahler manifolds.
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