Continuous logic and embeddings of Lebesgue spaces
classification
🧮 math.LO
math.FA
keywords
complexcontinuousgivelogicmathbbproofspaceswill
read the original abstract
We use the compactness theorem of continuous logic to give a new proof that $L^r([0,1]; \mathbb{R})$ isometrically embeds into $L^p([0,1]; \mathbb{R})$ whenever $1 \leq p \leq r \leq 2$. We will also give a proof for the complex case. This will involve a new characterization of complex $L^p$ spaces based on Banach lattices.
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