Titchmarsh theorems, Hausdorff-Young-Paley inequality and Lp-Lq boundedness of Fourier multipliers on harmonic NA groups

Abstract

In this paper we extend classical Titchmarsh theorems on the Fourier transform of Holder-Lipschitz functions to the setting of harmonic NA groups, which relate smoothness properties of functions to the growth and integrability of their Fourier transform. We prove a Fourier multiplier theorem for L2-Holder-Lipschitz spaces on Harmonic NA groups. We also derive conditions and a characterisation of Dini-Lipschitz classes on Harmonic NA groups in terms of the behaviour of their Fourier transform. Then, we shift our attention to the spherical analysis on Harmonic NA group. Since the spherical analysis on these groups fits well in the setting of Jacobi analysis we prefer to work in the Jacobi setting. We prove Lp-Lq boundedness of Fourier multipliers by extending a classical theorem of Hormander to the Jacobi analysis setting. On the way to accomplish this classical result we prove Paley-type inequality and Hausdorff-Young-Paley inequality. We also establish Lp-Lq boundedness of spectral multipliers of the Jacobi Laplacian.