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- Flat_convergence abstract "In mathematics, flat convergence is a notion for convergence of submanifolds of Euclidean space. It was first introduced by Hassler Whitney in 1957, and then extended to "integral currents" by Federer and Fleming in 1960. It forms a fundamental part of the field of geometric measure theory. The notion was applied to find solutions to Plateau's problem. In 2001 the notion of an integral current was extended to arbitrary metric spaces by Ambrosio and Kirchheim.".
- Flat_convergence wikiPageID "36180950".
- Flat_convergence wikiPageRevisionID "608540730".
- Flat_convergence first "T.C.".
- Flat_convergence hasPhotoCollection Flat_convergence.
- Flat_convergence id "G/g130040".
- Flat_convergence last "O'Neil".
- Flat_convergence subject Category:Convergence_(mathematics).
- Flat_convergence subject Category:Metric_geometry.
- Flat_convergence subject Category:Riemannian_geometry.
- Flat_convergence comment "In mathematics, flat convergence is a notion for convergence of submanifolds of Euclidean space. It was first introduced by Hassler Whitney in 1957, and then extended to "integral currents" by Federer and Fleming in 1960. It forms a fundamental part of the field of geometric measure theory. The notion was applied to find solutions to Plateau's problem. In 2001 the notion of an integral current was extended to arbitrary metric spaces by Ambrosio and Kirchheim.".
- Flat_convergence label "Flat convergence".
- Flat_convergence sameAs m.0k2hqgr.
- Flat_convergence sameAs Q5457832.
- Flat_convergence sameAs Q5457832.
- Flat_convergence wasDerivedFrom Flat_convergence?oldid=608540730.
- Flat_convergence isPrimaryTopicOf Flat_convergence.