On Kigami's conjecture of the embedding Wp(K)⊂ C(K)
Abstract
Let (K,d) be a connected compact metric space and p∈ (1, ∞). Under the assumption of [Assumption 2.15]Ki2 and the conductive p-homogeneity, we show that Wp(K)⊂ C(K) holds if and only if p>dimAR(K,d), where Wp(K) is Kigami's (1,p)-Sobolev space and dimAR(K,d) is the Ahlfors regular dimension.
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