Journal of Function Spaces and Applications (Jan 2004)

Local uniform convexity and Kadec-Klee type properties in K-interpolation spaces I: General Theory

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

DOI
https://doi.org/10.1155/2004/678358
Journal volume & issue
Vol. 2, no. 2
pp. 125 – 173

Abstract

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We present a systematic study of the interpolation of local uniform convexity and Kadec-Klee type properties in K-interpolation spaces. Using properties of the K-functional of J.Peetre, our approach is based on a detailed analysis of properties of a Banach couple and properties of a K-interpolation functional which guarantee that a given K-interpolation space is locally uniformly convex, or has a Kadec-Klee property. A central motivation for our study lies in the observation that classical renorming theorems of Kadec and of Davis, Ghoussoub and Lindenstrauss have an interpolation nature. As a partiular by-product of our study, we show that the theorem of Kadec itself, that each separable Banach space admits an equivalent locally uniformly convex norm, follows directly from our approach.