New parameters and Lebesgue-type estimates in greedy approximation
Abstract: The purpose of this paper is to quantify the size of the Lebesgue constants $(L_m){m=1}{\infty}$ associated with the thresholding greedy algorithm in terms of a new generation of parameters that modulate accurately some features of a general basis. This fine-tuning of constants allows us to provide an answer to the question raised by Temlyakov in 2011 to find a natural sequence of greedy-type parameters for arbitrary bases in Banach (or quasi-Banach) spaces which combined linearly with the sequence of unconditionality parameters $(k_m){m=1}{\infty}$ determines the growth of $(L_m)_{m=1}{\infty}$. Multiple theoretical applications and computational examples complement our study.
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