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- Cheeger_constant abstract "In Riemannian geometry, the Cheeger isoperimetric constant of a compact Riemannian manifold M is a positive real number h(M) defined in terms of the minimal area of a hypersurface that divides M into two disjoint pieces. In 1970, Jeff Cheeger proved an inequality that related the first nontrivial eigenvalue of the Laplace-Beltrami operator on M to h(M). This proved to be a very influential idea in Riemannian geometry and global analysis and inspired an analogous theory for graphs.".
- Cheeger_constant wikiPageID "16531739".
- Cheeger_constant wikiPageRevisionID "597956265".
- Cheeger_constant hasPhotoCollection Cheeger_constant.
- Cheeger_constant subject Category:Riemannian_geometry.
- Cheeger_constant comment "In Riemannian geometry, the Cheeger isoperimetric constant of a compact Riemannian manifold M is a positive real number h(M) defined in terms of the minimal area of a hypersurface that divides M into two disjoint pieces. In 1970, Jeff Cheeger proved an inequality that related the first nontrivial eigenvalue of the Laplace-Beltrami operator on M to h(M). This proved to be a very influential idea in Riemannian geometry and global analysis and inspired an analogous theory for graphs.".
- Cheeger_constant label "Cheeger constant".
- Cheeger_constant label "Константа Чигера".
- Cheeger_constant sameAs m.03y9br8.
- Cheeger_constant sameAs Q5089259.
- Cheeger_constant sameAs Q5089259.
- Cheeger_constant wasDerivedFrom Cheeger_constant?oldid=597956265.
- Cheeger_constant isPrimaryTopicOf Cheeger_constant.