Variation operators associated with the semigroups generated by Schr\"odinger operators with inverse square potentials

Abstract

By \Tta\t>0 we denote the semigroup of operators generated by the Friedrichs extension of the Schr\"odinger operator with the inverse square potential La=-+a|x|2 defined in the space of smooth functions with compact support in Rn\0\. In this paper we establish weighted Lp-inequalities for the maximal, variation, oscillation and jump operators associated with \tα ∂tα Tta\t>0, where α ≥ 0 and ∂ tα denotes the Weyl fractional derivative. The range of values p that works is different when a≥ 0 and when -(n-2)24<a<0.