One-box conditions for Carleson measures for the Dirichlet space
Abstract
We give a simple proof of the fact that a finite measure μ on the unit disk is a Carleson measure for the Dirichlet space if it satisfies the Carleson one-box condition μ(S(I))=O(φ(|I|)), where φ:(0,2π](0,∞) is an increasing function such that ∫02π(φ(x)/x)\,dx<∞. We further show that the integral condition on φ is sharp.
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