Conditional quasi-greedy bases in Hilbert and Banach spaces
Abstract
We show that, for quasi-greedy bases in Hilbert spaces, the associated conditionality constants grow at most as O( N)1-ε, for some ε>0, answering a question by Temlyakov. We show the optimality of this bound with an explicit construction, based on a refinement of the method of Olevskii. This construction leads to other examples of quasi-greedy bases with large kN in Banach spaces, which are of independent interest.
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