Greedy bases for Besov spaces
Abstract
We prove thatthe Banach space (n=1∞ pn)_q, which is isomorphic to certain Besov spaces, has a greedy basis whenever 1≤ p ≤∞ and 1<q<∞. Furthermore, the Banach spaces (n=1∞ pn)_1, with 1<p ∞, and (n=1∞ pn)c0, with 1 p<∞ do not have a greedy bases. We prove as well that the space (n=1∞ pn)_q has a 1-greedy basis if and only if 1≤ p=q ∞.
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