Singular integrals on ax+b hypergroups and an operator-valued spectral multiplier theorem

Abstract

Let L = -∂x2-(-1)x-1 ∂x be the Bessel operator on the half-line X = [0,∞) with measure x-1 \,d x. In this work we study singular integral operators associated with the Laplacian = -∂u2 + e2u L on the product G of X and the real line with measure d u. For any ≥ 1, the Laplacian is left-invariant with respect to a noncommutative hypergroup structure on G, which can be thought of as a fractional-dimension counterpart to ax+b groups. In particular, equipped with the Riemannian distance associated with , the metric-measure space G has exponential volume growth. We prove a sharp Lp spectral multiplier theorem of Mihlin--H\"ormander type for , as well as the Lp-boundedness for p ∈ (1,∞) of the associated first-order Riesz transforms. To this purpose, we develop a Calder\'on--Zygmund theory \`a la Hebisch--Steger adapted to the nondoubling structure of G, and establish large-time gradient heat kernel estimates for . In addition, the Riesz transform bounds for p > 2 hinge on an operator-valued spectral multiplier theorem, which we prove in greater generality and may be of independent interest.