Rescaling of unconditional Schauder frames in Hilbert spaces and completely bounded maps
Abstract
We prove that if every element u in a Hilbert space H admits a representation as unconditionally convergent series u=Σk=1∞ u, yk xk, then there exist nonzero scalars \αk\k=1∞ such that both sequences \αk xk\k=1∞ and \αk-1yk\k=1∞ are frames. Our result has the following equivalent reformulation: if :∞ B(H) is a bounded linear map such that for every element of the unit vector basis ek in ∞ the operator (ek) has rank one, then is completely bounded.
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