Lorentz Spaces and Embeddings Induced by Almost Greedy Bases in Banach Spaces

The aim of this paper is to undertake a systematic qualitative study of the built-in symmetry of almost greedy bases in Banach spaces. More specifically, by refining the techniques that Wojtaszczyk used in J Approx Theory 107(2), 293–314 2000 for quasi-greedy bases in Hilbert spaces, we show that an almost greedy basis in a Banach space X naturally induces embeddings that allow sandwiching X between two symmetric sequence spaces. Using classical interpolation techniques in combination with duality, we also explore what we label as interpolation of greedy bases. It is then proved that the only almost greedy basis shared by any two \(\ell _{p}\) spaces is equivalent to the standard unit vector basis and that there is no basis which is simultaneously (normalized and) greedy in two different \(L_{p}\) spaces. As a by-product of our work, we obtain a new characterization of greedy bases in Banach spaces in terms of bounded linear operators.