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- Mumford's_compactness_theorem abstract "In mathematics, Mumford's compactness theorem states that the space of compact Riemann surfaces of fixed genus g > 1 with no closed geodesics of length less than some fixed ε > 0 in the Poincaré metric is compact. It was proved by David Mumford (1971) as a consequence of a theorem about the compactness of sets of discrete subgroups of semisimple Lie groups generalizing Mahler's compactness theorem.".
- Mumford's_compactness_theorem wikiPageID "31187897".
- Mumford's_compactness_theorem wikiPageRevisionID "455582116".
- Mumford's_compactness_theorem authorlink "David Mumford".
- Mumford's_compactness_theorem first "David".
- Mumford's_compactness_theorem hasPhotoCollection Mumford's_compactness_theorem.
- Mumford's_compactness_theorem last "Mumford".
- Mumford's_compactness_theorem year "1971".
- Mumford's_compactness_theorem subject Category:Compactness_theorems.
- Mumford's_compactness_theorem subject Category:Kleinian_groups.
- Mumford's_compactness_theorem subject Category:Riemann_surfaces.
- Mumford's_compactness_theorem type Abstraction100002137.
- Mumford's_compactness_theorem type Communication100033020.
- Mumford's_compactness_theorem type CompactnessTheorems.
- Mumford's_compactness_theorem type Group100031264.
- Mumford's_compactness_theorem type KleinianGroups.
- Mumford's_compactness_theorem type Message106598915.
- Mumford's_compactness_theorem type Proposition106750804.
- Mumford's_compactness_theorem type Statement106722453.
- Mumford's_compactness_theorem type Theorem106752293.
- Mumford's_compactness_theorem comment "In mathematics, Mumford's compactness theorem states that the space of compact Riemann surfaces of fixed genus g > 1 with no closed geodesics of length less than some fixed ε > 0 in the Poincaré metric is compact. It was proved by David Mumford (1971) as a consequence of a theorem about the compactness of sets of discrete subgroups of semisimple Lie groups generalizing Mahler's compactness theorem.".
- Mumford's_compactness_theorem label "Mumford's compactness theorem".
- Mumford's_compactness_theorem sameAs m.0gh8fn8.
- Mumford's_compactness_theorem sameAs Q6935388.
- Mumford's_compactness_theorem sameAs Q6935388.
- Mumford's_compactness_theorem sameAs Mumford's_compactness_theorem.
- Mumford's_compactness_theorem wasDerivedFrom Mumford's_compactness_theorem?oldid=455582116.
- Mumford's_compactness_theorem isPrimaryTopicOf Mumford's_compactness_theorem.