On an Interesting Class of Variable Exponents

Alexei Yu. Karlovich; Ilya M. Spitkovsky

arXiv:1110.0299·math.CA·October 4, 2011·1 cites

On an Interesting Class of Variable Exponents

Alexei Yu. Karlovich, Ilya M. Spitkovsky

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Abstract

Let $M (R^{n})$ be the class of functions $p : R^{n} \to [1, \infty]$ bounded away from one and infinity and such that the Hardy-Littlewood maximal function is bounded on the variable Lebesgue space $L^{p (\cdot)} (R^{n})$ . We denote by $M^{*} (R^{n})$ the class of variable exponents $p \in M (R^{n})$ for which $1/ p (x) = θ / p_{0} + (1 - θ) / p_{1} (x)$ with some $p_{0} \in (1, \infty)$ , $θ \in (0, 1)$ , and $p_{1} \in M (R^{n})$ . Rabinovich and Samko \cite{RS08} observed that each globally log-H\"older continuous exponent belongs to $M^{*} (R^{n})$ . We show that the class $M^{*} (R^{n})$ contains many interesting exponents beyond the class of globally log-H\"older continuous exponents.

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TopicsAdvanced Harmonic Analysis Research · Advanced Banach Space Theory · Holomorphic and Operator Theory