Generalized Carleson Embeddings of M\"untz Spaces
Abstract
This paper establishes Carleson embeddings of M\"untz spaces Mq into weighted Lebesgue spaces Lp(dμ), where μ is a Borel regular measure on [0,1] satisfying μ([1-]) β. In the case β ≥slant 1 we show that such measures are exactly the ones for which Carleson embeddings Lpβ Lp(dμ) hold. The case β ∈ (0,1) is more intricate but we characterize such measures μ in terms of a summability condition on their moments. Our proof relies on a generalization of Lp estimates \`a la Gurariy-Macaev in the weighted Lp spaces setting, which we think can be of interest in other contexts.
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