On Banach spaces whose duals are \(L_ 1\) spaces
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Publication:2527162
DOI10.1007/BF02760079zbMath0156.36501OpenAlexW2066301195MaRDI QIDQ2527162
Aldo J. Lazar, Joram Lindenstrauss
Publication date: 1966
Published in: Israel Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf02760079
Related Items (20)
On a Roelcke-precompact Polish group that cannot act transitively on a complete metric space ⋮ Complex Lindenstrauss spaces with extreme points ⋮ On \(\ell_1\)-preduals distant by 1 ⋮ Generic Banach spaces and generic simplexes ⋮ Obituary: On the mathematical contributions of Joram Lindenstrauss ⋮ Properties of the Holmes space ⋮ Rethinking polyhedrality for Lindenstrauss spaces ⋮ On contractively complemented subspaces of separable \(L_1\)-preduals ⋮ Unnamed Item ⋮ Convexity and smoothness of Banach spaces with numerical index one ⋮ Convex sets, extreme points, and simplexes ⋮ Fraïssé limits in functional analysis ⋮ Correction to “On some subspaces of Banach spaces whose duals are 𝐿₁ spaces” ⋮ On the classification of the Banach spaces whose duals are \(L_1\) spaces ⋮ Banach spaces whose duals are \(L_ 1\) spaces and their representing matrices ⋮ Facial characterization of simplexes ⋮ Characterizations of Banach spaces whose duals are \(L_ 1\) spaces ⋮ Banach spaces whose duals are isomorphic to \(l_1(\Gamma)\) ⋮ Separable L\(_1\) preduals are quotients of C(\(\Delta\)) ⋮ Weak* fixed point property and the space of affine functions
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