Existence of almost greedy bases in mixed-norm sequence and matrix spaces, including Besov spaces

Abstract

We prove that the sequence spaces pq and the spaces of infinite matrices p(q), q(p) and (n=1∞ pn)_q, which are isomorphic to certain Besov spaces, have an almost greedy basis whenever 0<p<1<q<∞. More precisely, we custom-build almost greedy bases in such a way that the Lebesgue parameters grow in a prescribed manner. Our arguments critically depend on the extension of the Dilworth-Kalton-Kutzarova method from [S. J. Dilworth, N. J. Kalton, and D. Kutzarova, On the existence of almost greedy bases in Banach spaces, Studia Math. 159 (2003), no. 1, 67-101], which was originally designed for constructing almost greedy bases in Banach spaces, to make it valid for direct sums of mixed-normed spaces with nonlocally convex components. Additionally, we prove that the fundamental functions of all almost greedy bases of these spaces grow as (m1/q)m=1∞.