Abstract
The spaces Lp(, φ) for 1 ≤ p ≤ ∞, where φ is a faithful semifinite normal trace on a von Neumann algebra , are defined in (10),(2),(14). The problem of determining the general form of an isometry of one such space into another has been studied in (i), (6), (9), (12), (5). Our main result, Theorem 2, is a characterization of such isometries for 1 ≤ p ≤ ∞, ≠ 2. The method of proof is based on that of (7), where isometries between Lp function spaces are characterized. The main step in the proof is Theorem 1, which gives the conditions under which equality holds in Clarkson's inequality.
Publisher
Cambridge University Press (CUP)
Reference14 articles.
1. On the projection of norm one in $W^ *$-algebras
2. Isometries of 𝐿^{𝑝}-spaces associated with finite von Neumann algebras
3. Measures on the closed subspaces of a Hubert space;Gleason;J. Math. Mech,1957
4. Isometries of Lp-spaces associated with semifinite von Neumann algebras;Tam;Trans. Amer. Math. Soc,1979
5. On the isometries of certain function-spaces
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