Smoothing theorems for Radon transforms over hypersurfaces and related operators

Abstract

We extend the theorems of [G1] on Lp to Lps Sobolev improvement for translation invariant Radon and fractional singular Radon transforms over hypersurfaces, proving Lp to Lqs boundedness results for such operators. Here q ≥ p but s can be positive, negative, or zero. For many such operators we will have a triangle Z ⊂ (0,1) × (0,1) × R such that one has Lp to Lqs boundedness for (1 p, 1 q, s) beneath Z, and in the case of Radon transforms one does not have Lp to Lqs boundedness for (1 p, 1 q, s) above the plane containing Z, thereby providing a Sobolev space improvement result which is sharp up to endpoints for (1 p, 1 q) below Z. This triangle Z intersects the plane \(x1,x2,x3): x3 = 0\, and therefore we also have an Lp to Lq improvement result that is also sharp up to endpoints for certain ranges of p and q.