Weighted Plancherel estimates and sharp spectral multipliers for the Grushin operators

Abstract

We study the Grushin operators acting on d1x'× d2x" and defined by the formula \[ L=-Σ=1d1∂x'2 - (Σ=1d1|x'|2) Σ=1d2∂x"2. \] We obtain weighted Plancherel estimates for the considered operators. As a consequence we prove Lp spectral multiplier results and Bochner-Riesz summability for the Grushin operators. These multiplier results are sharp if d1 d2. We discuss also an interesting phenomenon for weighted Plancherel estimates for d1 <d2. The described spectral multiplier theorem is the analogue of the result for the sublaplacian on the Heisenberg group obtained by D. M\"uller and E.M. Stein and by W. Hebisch.