A dilation theoretic approach to Banach spaces
Abstract
For a complex Banach space X, we prove that X is a Hilbert space if and only if every strict contraction T on X dilates to an isometry if and only if for every strict contraction T on X the function AT: X → [0, ∞] defined by AT(x)=(\|x\|2 -\|Tx\|2)12 gives a norm on X. We also find several other necessary and sufficient conditions in this thread such that a Banach sapce becomes a Hilbert space. We construct examples of strict contractions on non-Hilbert Banach spaces that do not dilate to isometries. Then we characterize all strict contractions on a non-Hilbert Banach space that dilate to isometries and find explicit isometric dilation for them. We prove several other results including characterizations of complemented subspaces in a Banach space, extension of a Wold isometry to a Banach space unitary and describing norm attainment sets of Banach space operators in terms of dilations.
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