Quantitative harmonic approximations and Dorronsoro's Theorem in metric measure spaces
Abstract
Suppose X is an RCD(K,N) space with K ∈ R and N ∈ (1,∞). We obtain a characterisation of the Newtonian-Sobolev space N1,2(X) in terms of a quantity which measures to what extent a function is locally (across all scales and locations) well-approximated by harmonic functions. A similar characterisation is obtained which further takes into account the local oscillations of the approximating harmonic functions. The first characterisation is new even when X = Rn; the second characterisation is a version of Dorronsoro's Theorem in RCD spaces and gives a new proof of (a special case) of this theorem in Euclidean space.
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