Characterizations of Kadec-Klee properties in symmetric spaces of measurable functions

Chilin, V.; Dodds, P.; Sedaev, A.; Sukochev, F.

doi:10.1090/S0002-9947-96-01782-5

Characterizations of Kadec-Klee properties in symmetric spaces of measurable functions
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by V. I. Chilin, P. G. Dodds, A. A. Sedaev and F. A. Sukochev PDF

Trans. Amer. Math. Soc. 348 (1996), 4895-4918 Request permission

Abstract:

We present several characterizations of Kadec-Klee properties in symmetric function spaces on the half-line, based on the $K$-functional of J. Peetre. In addition to the usual Kadec-Klee property, we study those symmetric spaces for which sequential convergence in measure (respectively, local convergence in measure) on the unit sphere coincides with norm convergence.

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