Certain Weighted Lp-improving estimates for the totally-geodesic k-plane transform on simply connected spaces of constant curvature
Abstract
In this article we study the Lp-improving mapping properties of the totally-geodesic k-plane transform on simply connected spaces of constant curvature, namely, Rn, Hn and Sn. We begin our study by answering the question of the existence of the totally-geodesic k-plane transform on weighted Lp spaces with radial weights arising from the volume growth on these spaces. These weights arise naturally from the geometry of these spaces. We then derive necessary and sufficient conditions for the k-plane transform of radial functions to be bounded on weighted Lebesgue spaces, with radial power weights. Following an idea of Kurusa, we also derive formulae for the totally-geodesic k-plane transform of general functions on the hyperbolic space and the sphere. Using this formula, and an elementary technique of Minkowski inequality, we prove weighted Lp-Lp boundedness of the k-plane transform of general functions as well. Along with this, we also study the end-point behaviour of the transform, where the ``end-point" naturally arises due to either the existence conditions or the necessary conditions for boundedness.
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