# Characterization of weight-semi-greedy bases

**Authors:** Pablo M. Bern\'a

arXiv: 1902.10986 · 2019-03-01

## TL;DR

This paper extends the characterization of weight-semi-greedy bases by removing the finite cotype condition and relaxing the Schauder basis requirement using $ho$-admissibility, advancing greedy approximation theory.

## Contribution

It proves that weight-semi-greediness and weight-almost-greediness are equivalent without the finite cotype assumption and introduces $ho$-admissibility to relax basis conditions.

## Key findings

- Removed the finite cotype condition in the characterization.
- Established equivalence of w-semi-greedy and w-almost-greedy bases.
- Introduced $ho$-admissibility to relax basis assumptions.

## Abstract

One classical result in greedy approximation theory is that almost-greedy and semi-greedy bases are equivalent in the context of Schauder bases in Banach spaces with finite cotype. This result was proved by S. J. Dilworth, N. J. Kalton and D. Kutzarova in [7] and, recently, the first author in [2] proved that the condition of finite cotype can be removed in this result. In [11], the authors extend the notion of semi-greediness to the context of weights and proved the following: if w is a weight and $\mathcal B$ is a Schauder basis in a Banach space $\mathbb X$ with finite cotype, then w-semi-greediness and w-almost-greediness are equivalent notions. In this paper, we prove the same characterization but removing the condition of finite cotype and, also, we try to relax the condition of Schauder in the characterization of semi-greediness using the $\rho$-admissibility, notion introduced recently in [4].

## Full text

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## References

15 references — full list in the complete paper: https://tomesphere.com/paper/1902.10986/full.md

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Source: https://tomesphere.com/paper/1902.10986