Hessianizability of surface metrics

Abstract

A symmetric quadratic form g on a surface~M is said to be locally Hessianizable if each p∈ M has an open neighborhood~U on which there exists a local coordinate chart (x1,x2):U2 and a function f:U such that, on U, we have g = ∂2 f∂ xi∂ xj\,d xi xj. In this article, I show that, when g is nondegenerate and smooth, it is always smoothly locally Hessianizable.

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