Endpoint Estimates For Riesz Transform And Hardy-Hilbert Type Inequalities

Abstract

We consider a class of non-doubling manifolds M defined by taking connected sum of finite Riemannian manifolds with dimension N which has the form Rni× Mi and the Euclidean dimension ni are not necessarily all the same. In arXiv:1805.00132v3 [math.AP], Hassell and Sikora proved that the Riesz transform on M is weak type (1,1), bounded on Lp(M) for all 1<p<n* where n* = k nk and is unbounded for p n*. In this note we show that the Riesz transform is bounded from Lorentz space Ln* ,1(M) to Ln*,1(M). This complete the picture by obtaining the end point results for p=n*. Our approach is based on parametrix construction described in arXiv:1805.00132v3 [math.AP] and a generalisation of Hardy-Hilbert type inequalities first studied by Hardy, Littlewood and P\'olya.