On dimension-free and potential-free estimates for Riesz transforms associated with Schr\"odinger operators
Abstract
Let L=- + V(x) be a Schr\"odinger operator on Rd, where V(x)≥ 0, V∈ L2 loc ( Rd). We give a short proof of dimension free Lp( Rd) estimates, 1<p≤ 2, for the vector of the Riesz transforms (∂∂ x1L-1/2, ∂∂ x2L-1/2,…,∂∂ xdL-1/2). The constant in the estimates does not depend on the potential V. We simultaneously provide a short proof of the weak type (1,1) estimates for ∂∂ xjL-1/2.
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