Besov spaces via hyperbolic fillings

Abstract

We establish a new characterization of the homogeneous Besov spaces Bsp,q(Z) with smoothness s ∈ (0,1) in the setting of doubling metric measure spaces (Z,d,μ). The characterization is given in terms of a hyperbolic filling of the metric space (Z,d), a construction which has previously appeared in the context of other function spaces in [3,1,2]. We use the characterization to obtain results concerning the density of Lipschitz functions in the spaces Bsp,q(Z) and a general complex interpolation formula in the smoothness range 0 < s < 1.