Resolvent at low energy and Riesz transform for Schrodinger operators on asymptotically conic manifolds, I
Abstract
We analyze the resolvent R(k)=(P+k2)-1 of Schr\"odinger operators P=+V with short range potential V on asymptotically conic manifolds (M,g) (this setting includes asymptotically Euclidean manifolds) near k=0. We make the assumption that the dimension is greater or equal to 3 and that P has no L2 null space and no resonance at 0. In particular, we show that the Schwartz kernel of R(k) is a conormal polyhomogeneous distribution on a desingularized version of M× M× [0,1]. Using this, we show that the Riesz transform of P is bounded on Lp for 1<p<n and that this range is optimal if V is not identically zero or if M has more than one end. We also analyze the case V=0 with one end. In a follow-up paper, we shall deal with the same problem in the presence of zero modes and zero-resonances.
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