Non-collapsing condition and Sobolev embeddings for Hajasz-Besov spaces
Abstract
In this paper we will focus on understanding the relation between Sobolev embedding theorems for Hajasz-Besov spaces defined on a doubling metric measure space (,d,μ) and the non-collapsing condition of the measure, i.e. \[ ∈fx∈μ(B(x,1))>0. \] We will also obtain embedding results for Hajasz-Besov spaces whose modulus of smoothness is generated by a rearrangement invariant quasi-norm.
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