On a Class of Non-Integrable Multipliers for the Jacobi Transform
Abstract
We show that a bounded function m on not necessarily integrable at infinity may still yield Lp-bounded convolution operators for the Jacobi transform if the nontangential boundary values of ω m along the edges of a certain strip in yield Euclidean Fourier multipliers, for ω suitably defined. This partially generalizes similar results by Giulini, Mauceri, and Meda (on rank one symmetric spaces) and Astengo (on Damek--Ricci spaces).
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