Bochner's formula - Misplaced Pages

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It has been suggested that this article be merged with Bochner identity and Talk:Bochner identity#Merger proposal. (Discuss) Proposed since February 2009.

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In mathematics, Bochner's formula is a statement relating harmonic functions on a Riemannian manifold $(M,g)$ to the Ricci curvature. More specifically, if $u:M\rightarrow \mathbb {R}$ is a harmonic function (i.e., $\triangle _{g}u=0$ , where $\triangle _{g}$ is the Laplacian with respect to $g$ ), then

$\triangle {\frac {1}{2}}|\nabla u|^{2}=|\nabla ^{2}u|^{2}-{\mbox{Ric}}(\nabla u,\nabla u)$ ,

where $\nabla u$ is the gradient of $u$ with respect to $g$ . The formula is an example of a Weitzenböck identity. Bochner used this formula to prove the Bochner vanishing theorem.

The Bochner formula is often proved using supersymmetry or Clifford algebra methods.

See also