The Isometries of the Bochner Space L^p(\mu,H)

BAHATTİN CENGİZ

The Isometries of the Bochner Space L^p(\mu,H)

Authors: BAHATTİN CENGİZ

Abstract: In this article, the known characterization of the surjective linear isometries of the Bochner space $L^p(\mu, H)$, for a $\sigma$-finite measure $\mu$ and an arbitrary Hilbert space $H$, in terms of regular set isomorphisms of the $\sigma$-algebra involved and strongly measurable families of surjective isometries of $H$, is extended to arbitrary measures.

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