Reverse Carleson measures for spaces of analytic functions
Abstract
Let X be a quasi-Banach space of analytic functions in the unit disc and let q>0. A finite positive Borel measure μ in the closed unit disc D is called a q-reverse Carleson measure for X if and only if there exists a constant C>0 such that \|f\|X≤ C \|f\|Lq( D,dμ) for all f∈ X C( D). We fully characterize the q-reverse Carleson measures with all q>0 for Hardy spaces Hp( D) with all 0<p≤ ∞, for the space BMOA( D) and for the Bloch space. In addition, we describe q-reverse Carleson measures for the holomorphic Triebel--Lizorkin spaces HF0q,r and the holomorphic Besov spaces HB0q,r. Related results are obtained for the Hardy spaces and certain holomorphic Triebel--Lizorkin spaces in the unit ball of Cd.
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