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- Milman–Pettis_theorem abstract "In mathematics, the Milman–Pettis theorem states that every uniformly convex Banach space is reflexive.The theorem was proved independently by D. Milman (1938) and B. J. Pettis (1939). S. Kakutani gave a different proof in 1939, and John R. Ringrose published a shorter proof in 1959.Mahlon M. Day (1941) gave examples of reflexive Banach spaces which are not isomorphic to any uniformly convex space.".
- Milman–Pettis_theorem wikiPageID "9144207".
- Milman–Pettis_theorem wikiPageRevisionID "551287885".
- Milman–Pettis_theorem subject Category:Banach_spaces.
- Milman–Pettis_theorem subject Category:Theorems_in_functional_analysis.
- Milman–Pettis_theorem comment "In mathematics, the Milman–Pettis theorem states that every uniformly convex Banach space is reflexive.The theorem was proved independently by D. Milman (1938) and B. J. Pettis (1939). S. Kakutani gave a different proof in 1939, and John R. Ringrose published a shorter proof in 1959.Mahlon M. Day (1941) gave examples of reflexive Banach spaces which are not isomorphic to any uniformly convex space.".
- Milman–Pettis_theorem label "Milman–Pettis theorem".
- Milman–Pettis_theorem sameAs Milman%E2%80%93Pettis_theorem.
- Milman–Pettis_theorem sameAs Q6860180.
- Milman–Pettis_theorem sameAs Q6860180.
- Milman–Pettis_theorem wasDerivedFrom Milman–Pettis_theorem?oldid=551287885.