Lichnerowicz vanishing theorem: Difference between revisions
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==Statement== | ==Statement== | ||
If the [[scalar curvature]] on an even-dimensional [[ | If the [[scalar curvature]] on an even-dimensional [[spin manifold]] is positive at all points, then the space of [[harmonic spinor]]s vanishes. | ||
==Relation with other results== | ==Relation with other results== | ||
Revision as of 23:22, 13 December 2007
This is a vanishing theorem
Statement
If the scalar curvature on an even-dimensional spin manifold is positive at all points, then the space of harmonic spinors vanishes.
Relation with other results
Gromov-Lawson theorem
Further information: Gromov-Lawson theorem on spin structure
This relates positive scalar curvature with spin structure in a somewhat different way: it says that any differential manifold of dimension at least 5 must admit either a spin structure or a metric with positive scalar curvature.