The Bernstein problem for affine maximal hypersurfaces

Neil S. Trudinger; Xu Jia Wang

doi:10.1007/s002220000059

The Bernstein problem for affine maximal hypersurfaces

Neil S. Trudinger^*, Xu Jia Wang

^*Corresponding author for this work

Research output: Contribution to journal › Article › peer-review

115 Citations (Scopus)

Abstract

In this paper, we prove the validity of the Chern conjecture in affine geometry [18], namely that an affine maximal graph of a smooth, locally uniformly convex function on two dimensional Euclidean space, R², must be a paraboloid. More generally, we shall consider the n-dimensional case, Rⁿ, showing that the corresponding result holds in higher dimensions provided that a uniform, "strict convexity" condition holds. We also extend the notion of "affine maximal" to non-smooth convex graphs and produce a counterexample showing that the Bernstein result does not hold in this generality for dimension n ≥ 10.

Original language	English
Pages (from-to)	399-422
Number of pages	24
Journal	Inventiones Mathematicae
Volume	140
Issue number	2
DOIs	https://doi.org/10.1007/s002220000059
Publication status	Published - 2000

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10.1007/s002220000059

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AB - In this paper, we prove the validity of the Chern conjecture in affine geometry [18], namely that an affine maximal graph of a smooth, locally uniformly convex function on two dimensional Euclidean space, R2, must be a paraboloid. More generally, we shall consider the n-dimensional case, Rn, showing that the corresponding result holds in higher dimensions provided that a uniform, "strict convexity" condition holds. We also extend the notion of "affine maximal" to non-smooth convex graphs and produce a counterexample showing that the Bernstein result does not hold in this generality for dimension n ≥ 10.

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JF - Inventiones Mathematicae

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ER -

The Bernstein problem for affine maximal hypersurfaces

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