Reeb vector field - Misplaced Pages

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In mathematics, the Reeb vector field, named after the French mathematician Georges Reeb, is a notion that appears in various domains of contact geometry including:

in a contact manifold, given a contact 1-form $\alpha$ , the Reeb vector field satisfies $R\in \mathrm {ker} \ d\alpha ,\ \alpha (R)=1$ ,
in particular, in the context of Sasakian manifold.

Definition

Let $\xi$ be a contact vector field on a manifold $M$ of dimension $2n+1$ . Let $\xi =Ker\;\alpha$ for a 1-form $\alpha$ on $M$ such that $\alpha \wedge (d\alpha )^{n}\neq 0$ . Given a contact form $\alpha$ , there exists a unique field (the Reeb vector field) $X_{\alpha }$ on $M$ such that: