Interpolating sequences for some subsets of analytic Besov type spaces

Abstract

Let Bp(s) be an analytic Besov type space. Let M(Bp(s)) be the class of multipliers of Bp(s) and let F(p, p-2, s) be the M\"obius invariant subspace generated by Bp(s). In this paper, when 0<s<1 and \s, 1-s\<p≤ 1, we give a completed description of interpolating sequences for M(Bp(s)) and F(p, p-2, s) H∞. We also consider certain condition appeared in this description by an Lp characterization and the closure of F(p, p-2, s) in the Bloch space.