Matches in DBpedia 2015-10 for { <http://dbpedia.org/resource/Chengs_eigenvalue_comparison_theorem> ?p ?o }
Showing triples 1 to 44 of
44
with 100 triples per page.
- Chengs_eigenvalue_comparison_theorem abstract "In Riemannian geometry, Cheng's eigenvalue comparison theorem states in general terms that when a domain is large, the first Dirichlet eigenvalue of its Laplace–Beltrami operator is small. This general characterization is not precise, in part because the notion of "size" of the domain must also account for its curvature. The theorem is due to Cheng (1975b). Using geodesic balls, it can be generalized to certain tubular domains (Lee 1990).".
- Chengs_eigenvalue_comparison_theorem wikiPageID "23636044".
- Chengs_eigenvalue_comparison_theorem wikiPageLength "4131".
- Chengs_eigenvalue_comparison_theorem wikiPageOutDegree "22".
- Chengs_eigenvalue_comparison_theorem wikiPageRevisionID "610707205".
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Academic_Press.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink American_Mathematical_Society.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Bartas_theorem.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Category:Chinese_mathematical_discoveries.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Category:Theorems_in_Riemannian_geometry.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Comparison_theorem.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Curvature.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Dirichlet_eigenvalue.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Eigenvalue_comparison_theorem.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Geodesic_ball.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Geodesic_dome.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Glossary_of_Riemannian_and_metric_geometry.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Injectivity_radius.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Journal_of_Differential_Geometry.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Laplace–Beltrami_operator.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Mathematical_Proceedings_of_the_Cambridge_Philosophical_Society.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink McKean’s_inequality.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Ricci_curvature.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Riemannian_geometry.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Riemannian_manifold.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Sectional_curvature.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Simply_connected.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Simply_connected_space.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLink Space_form.
- Chengs_eigenvalue_comparison_theorem wikiPageWikiLinkText "Cheng's eigenvalue comparison theorem".
- Chengs_eigenvalue_comparison_theorem hasPhotoCollection Chengs_eigenvalue_comparison_theorem.
- Chengs_eigenvalue_comparison_theorem wikiPageUsesTemplate Template:Citation.
- Chengs_eigenvalue_comparison_theorem wikiPageUsesTemplate Template:Harv.
- Chengs_eigenvalue_comparison_theorem wikiPageUsesTemplate Template:Harvtxt.
- Chengs_eigenvalue_comparison_theorem wikiPageUsesTemplate Template:Reflist.
- Chengs_eigenvalue_comparison_theorem subject Category:Chinese_mathematical_discoveries.
- Chengs_eigenvalue_comparison_theorem subject Category:Theorems_in_Riemannian_geometry.
- Chengs_eigenvalue_comparison_theorem comment "In Riemannian geometry, Cheng's eigenvalue comparison theorem states in general terms that when a domain is large, the first Dirichlet eigenvalue of its Laplace–Beltrami operator is small. This general characterization is not precise, in part because the notion of "size" of the domain must also account for its curvature. The theorem is due to Cheng (1975b). Using geodesic balls, it can be generalized to certain tubular domains (Lee 1990).".
- Chengs_eigenvalue_comparison_theorem label "Cheng's eigenvalue comparison theorem".
- Chengs_eigenvalue_comparison_theorem sameAs m.06zl3h_.
- Chengs_eigenvalue_comparison_theorem sameAs Q5091194.
- Chengs_eigenvalue_comparison_theorem sameAs Q5091194.
- Chengs_eigenvalue_comparison_theorem wasDerivedFrom Chengs_eigenvalue_comparison_theoremoldid=610707205.
- Chengs_eigenvalue_comparison_theorem isPrimaryTopicOf Chengs_eigenvalue_comparison_theorem.