Holm–Bonferroni method: Difference between revisions

Revision as of 14:12, 3 February 2014

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 $α$ , the Reeb vector field satisfies $R \in k e r d α, α (R) = 1$ ,
in particular, in the context of Sasakian manifold#The Reeb vector field.

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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 <math>\alpha</math>, the Reeb vector field satisfies <math>R \in \mathrm{ker }\ d\alpha, \ \alpha (R)  = 1 </math>,
+* in particular, in the context of [[Sasakian manifold#The Reeb vector field]].
+[[Category:Contact geometry]]

Holm–Bonferroni method: Difference between revisions

Revision as of 14:12, 3 February 2014

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