On the Reverse Inequality of Riesz transform on metric cone with potential

Abstract

Let M=(0,∞)r× Y be a d-dimensional (d 3) metric cone with metric<br/>g=dr2+r2h, where (Y,h) is a closed Riemannian manifold. Let<br/>H=+V0/r2 be the associated Schrodinger operator, with<br/>V0∈ C∞(Y) satisfying the positivity condition<br/>Y+V0+(d-2)2/4>0. First, we complement previous results by proving<br/>Lorentz-type endpoint estimates for the Riesz transform ∇ H-1/2:<br/>it is of restricted weak type at both endpoints of its Lp-boundedness range.<br/>Second, we establish the sharp reverse inequality<br/>\|H1/2f\|Lp C(\|∇ f\|Lp+\|f/r\|Lp)<br/>which holds if and only if<br/>\[<br/>d((d+4)/2+μ0,\,d)<br/> < p <<br/>d((d-2)/2-μ0,\,0).\]

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