Title

Rigidity for local holomorphic conformal embeddings from B_n into B_{N_1}×…× B_{N_m}.

Document Type

Article

Publication Date

2012

Publication Source

Journal of Differential Geometry

Volume

90

Issue

2

Inclusive pages

329-349

Abstract

In this article, we study local holomorphic isometric embeddings from Bn into BN1×∙∙∙×BNm with respect to the normalized Bergman metrics up to conformal factors. Assume that each conformal factor is smooth Nash algebraic. Then each component of the map is a multi-valued holomorphic map between complex Euclidean spaces by the algebraic extension theorem derived along the lines of Mok, and Mok and Ng. Applying holomorphic continuation and analyzing real analytic subvarieties carefully, we show that each component is either a constant map or a proper holomorphic map between balls. Applying a linearity criterion of Huang, we conclude the total geodesy of non-constant components.

Disciplines

Mathematics

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Link to Original Published Item

http://projecteuclid.org/euclid.jdg/1335230850