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Diff — Reflexive space

Revision #909 → #1531 · back to history

addedReflexive space (lead)9314cdefdb26
addedStrong dualb22260e5ba3a
addedBidual66e4972c39a4
addedEvaluation map8e9f0cd73424
addedSemi-reflexive and reflexive TVS5fd8fc0904a4
addedNormable reflexive iff semi-reflexivec2b8bd2cf73d
addedDual normed spacee66c6463c837
addedBidual normed spacef7c3e7659e02
addedEvaluation map is isometric injection8eb3a6e1c50f
addedReflexive normed spaced793e43042fb
addedReflexive normed space is Banach07b9abe30b10
addedQuasi-reflexive354b43c24c81
addedFinite-dimensional normed space is reflexive33210b3252cb
addedc0, ℓ1, ℓ∞ not reflexive91b7ed73758c
addedHilbert and Lp spaces reflexive69516f668d49
addedMilman–Pettis theorem3ad37e825afa
addedL1, L∞, C[0,1] not reflexive7df7e4c27894
addedSchatten class operatorse0262cfcd4ce
addedOnly infinite-dim can be non-reflexivead4bdbc4f92d
addedIsomorphism preserves reflexivity7eb7e86c0a1c
addedClosed subspace, dual, quotient of reflexive945ed88b0b9e
addedReflexive iff dual is reflexivee6cef2da137d
addedKakutani's theorem6f8f820a8123
addedBounded sequence has weakly convergent subsequence9a685c53c9ba
addedRiesz's lemma at distance 1c3054c11deb1
addedRiesz lemma example in reflexive Banach9c830b0827b8
addedJames' theorem (functional attains supremum)e6fefcdf03f6
addedClosed convex sets weakly compact, intersection nonempty9af7614e8ad5
addedClosest point in convex subsetacc260b3a4cd
addedReflexive separable iff dual separable195555402a44
addedSuper-reflexive (informal)b7aabb8fbb7c
addedFinitely representable9178b04344df
addedFinitely representable in ℓ2 is Hilbert787ddf82afbd
addedSuper-reflexive (formal)c1cbd8c27d7c
addedJames: super-reflexive iff dual super-reflexiveb5d0a6d02aab
addedVectorial binary tree591e69a59499
addedδ-separated tree40ee4a00af47
addedTree characterization of super-reflexivity69269cbee6df
addedUniformly convex implies super-reflexive2ed7cab7f5fc
addedEnflo's theorem21c9dd93a006
addedPisier's modulus of convexity boundd65bd3bccca9
addedSemi-reflexive and reflexive locally convex2b44b7f945e7
addedSemi-reflexive iff Heine–Borel (weak)fa4b831213ac
addedReflexive iff semi-reflexive and barreleda04cf27804bb
addedStrong dual of semireflexive is barrelled0fb450ab73df
addedCanonical injection topological embedding iff infrabarreledf5a7840a97d0
addedCharacterizations of semireflexive49179b73b49e
addedCharacterizations of reflexive locally convexa7dd0163cd71
addedCharacterizations of reflexive normed space742453b2b30b
addedSeparation by hyperplane characterizationc4a24ab922f0
addedJames' theorem9a840eb22995
addedSemireflexive normed is reflexive Banachc12eefc47b01
addedClosed subspace of reflexive Banach reflexive9d039ab496e0
addedThree-space property0702a0391f82
addedBarreled semireflexive implies reflexive684099ca199e
addedStrong dual of reflexive is reflexive; Montel is reflexive70cbd5abd74f
addedReflexive Hausdorff locally convex is barrelled4ff0a4af53f4
addedGoldstine's theorem42b3e849e7bc
addedFinite-dim Hausdorff TVS is reflexivea2fd9b7ba9f3
addedNormed reflexive iff locally convex reflexive45d8994bafe9
addedSemi-reflexive not reflexive (weak topology)29bddf605f1b
addedMontel spaces are reflexivea302d8ec6933
addedNon-reflexive TVS with reflexive strong dual933847fb9aa2
addedStereotype / polar reflexive space456580e20143
addedReflective spaced28f2ad6ca1d