Duality for α-M\"obius invariant Besov spaces

Abstract

For 1≤ p≤ ∞ and α>0, Besov spaces Bpα play a key role in the theory of α-M\"obius invariant function spaces. In some sense, B1α is the minimal α-M\"obius invariant function space, B2α is the unique α-M\"obius invariant Hilbert space, and B∞α is the maximal α-M\"obius invariant function space. In this paper, under the α-M\"obius invariant pairing and by the space B∞α, we identify the predual and dual spaces of B1α. In particular, the corresponding identifications are isometric isomorphisms. The duality theorem via the α-M\"obius invariant pairing for Bpα with p>1 is also given.