Representing matrices, M-ideals and tensor products of L1-predual spaces
doi:10.17398/2605-5686.33.1.33
Palabras clave:
representing matrix, generalized diagram, directed sub diagram, M -ideals, tensor productsResumen
Motivated by Bratteli diagrams of Approximately Finite Dimensional (AF) C* - algebras, we consider diagrammatic representations of separable L1 -predual spaces and show that, in analogy to a result in AF C* -algebra theory, in such spaces, every M-ideal corresponds to directed sub diagram. This allows one, given a representing matrix of a L1-predual space, to recover a representing matrix of an M-ideal in X. We give examples where the converse is true in the sense that given an M-ideal in a L1-predual space X, there exists a diagrammatic representation of X such that the M-ideal is given by a directed sub diagram and an algorithmic way to recover a representing matrix of M-ideals in these spaces. Given representing matrices of two L1-predual spaces we construct a representing matrix of their injective tensor product.
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Referencias
K.R. Davidson, “ C ∗ -Algebras by Example ”, Fields Institute Monographs, 6, American Mathematical Society, Providence, RI, 1996.
A.B. Hansen, Y. Sternfeld, On the characterization of the dimension of a compact metric space K by the representing matrices of C(K), Israel J. Math. 22 (2) (1975), 148 – 167.
A.J. Lazar, J. Lindenstraus, Banach Spaces whose duals are L1 spaces and their representing matrices, Acta Math. 126 (1971), 165 – 193.
A. Lima, V. Lima, E. Oja, Absolutely summing operators on C[0,1] as a tree space and the bounded approximation property, J. Funct. Anal. 259 (11) (2010), 2886 – 2901.
J. Lindenstraus, “ Extension of Compact Operators ”, Mem. Amer. Math. Soc. no. 48, American Mathematical Society, Providence, RI, 1964.
J. Lindenstrauss, G. Olsen, Y. Sternfeld, The Poulsen simplex, Ann. Inst. Fourier (Grenoble) 28 (1) (1978), vi, 91 – 114.
W. Lusky, On Separable Lindenstrauss Spaces, J. Functional Analysis 26 (2) (1977), 103 – 120.
T.S.S.R.K. Rao, On almost isometric ideals in Banach spaces, Monatsh. Math. 181 (1) (2016), 169 – 176.