Besov spaces induced by doubling weights

Abstract

Let 1 p<∞, 0<q<∞ and be a two-sided doubling weight satisfying 0 r<1(1-r)q∫r1(t)\,dt∫0r(s)(1-s)q\,ds<∞. The weighted Besov space Bp,q consists of those f∈ Hp such that ∫01 (∫02π |f'(reiθ)|p\,dθ)q/p(r)\,dr<∞. Our main result gives a characterization for f∈ Bp,q depending only on |f|, p, q and . As a consequence of the main result and inner-outer factorization, we obtain several interesting by-products. In particular, we show the following modification of a classical factorization by F. and R. Nevanlinna: If f∈ Bp,q, then there exist f1,f2∈ Bp,q H∞ such that f=f1/f2. In addition, we give a sufficient and necessary condition guaranteeing that the product of f∈ Hp and an inner function belongs to Bp,q. Applying this result, we make some observations on zero sets of Bp,p.