A Hardy-Littlewood Maximal Operator Adapted to the Harmonic Oscillator

Abstract

This paper constructs a Hardy-Littlewood type maximal operator adapted to the Schr\"odinger operator L := - + |x|2 acting on L2(Rd). It achieves this through the use of the Gaussian grid γ0, constructed by J. Maas, J. van Neerven and P. Portal with the Ornstein-Uhlenbeck operator in mind. At the scale of this grid, this maximal operator will resemble the classical Hardy-Littlewood operator. At a larger scale, the cubes of the maximal function are decomposed into cubes from γ0 and weighted appropriately. Through this maximal function, a new class of weights is defined, Ap+, with the property that for any w ∈ Ap+, the heat maximal operator associated with L is bounded from Lp(w) to itself. This class contains any other known class that possesses this property. In particular, it is strictly larger than Ap.