A Rigidity Theorem for Affine K\"ahler-Ricci Flat Graph

An-Min Li; Ruiwei Xu

A Rigidity Theorem for Affine K\"ahler-Ricci Flat Graph

Differential Geometry 2007-10-22 v2 Analysis of PDEs

Authors: An-Min Li , Ruiwei Xu

Abstract

It is shown that any smooth strictly convex global solution of $\det(\frac{\partial^{2}u}{\partial \xi_{i}\partial \xi_{j}}) = \exp \left\{-\sum_{i=1}^n d_i \frac{\partial u}{\partial \xi_{i}} - d_0\right\},$ where $d_0$ , $d_1$ ,..., $d_n$ are constants, must be a quadratic polynomial. This extends a well-known theorem of J\"{o}rgens-Calabi-Pogorelov.

A Rigidity Theorem for Affine K\"ahler-Ricci Flat Graph

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