Alex Amenta, Emiel Lorist, Mark Veraar
Published 2017-05-22Version 1
We prove various extensions of the Coifman-Rubio de Francia-Semmes multiplier theorem to operator-valued multipliers on Banach function spaces. Our results involve a new boundedness condition on sets of operators which we call $\ell^{r}(\ell^{s})$-boundedness, which implies $\mathcal{R}$-boundedness in many cases. The proofs are based on new Littlewood-Paley-Rubio de Francia-type estimates in Banach function spaces which were recently obtained by the authors.
Fourier multipliers for weighted $L^{2}$ spaces with Lévy-Khinchin-Schoenberg weights
Products and Factors of Banach function spaces
Operator-Valued $L_{q}\to L_{p}$ Fourier Multipliers
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