Journal of Function Spaces and Applications (Jan 2004)

Local Uniform Convexity and Kadec-Klee Type Properties in K-interpolation spaces II

  • Peter G. Dodds,
  • Theresa K. Dodds,
  • Alexander A. Sedaev,
  • Fyodor A. Sukochev

DOI
https://doi.org/10.1155/2004/849723
Journal volume & issue
Vol. 2, no. 3
pp. 323 – 356

Abstract

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We study local uniform convexity and Kadec-Klee type properties in K-interpolation spaces of Lorentz couples. We show that a wide class of Banach couples of (commutative and) non-commutative Lorentz spaces possess the (so-alled) (DGL)-property originally introduced by Davis, Ghoussoub and Lindenstrauss in the context of renorming order continuous Banach latties. This property is used as a key tool to show that local uniform convexity and certain Kadec-Klee type properties in non-commutative symmetric spaces of measurable operators may be inferred from corresponding properties of the parameter space of the K-interpolation method. Further applications are given to renorming properties of separable symmetric Banach function spaces and their non-commutative counterparts.