An optimal multiplier theorem for Grushin operators in the plane, I

Abstract

Let L = -∂x2 - V(x) ∂y2 be the Grushin operator on R2 with coefficient V : R [0,∞). Under the sole assumptions that V(-x) V(x) xV'(x) and x2 |V''(x)| V(x), we prove a spectral multiplier theorem of Mihlin--H\"ormander type for L, whose smoothness requirement is optimal and independent of V. The assumption on the second derivative V'' can actually be weakened to a H\"older-type condition on V'. The proof hinges on the spectral analysis of one-dimensional Schr\"odinger operators, including universal estimates of eigenvalue gaps and matrix coefficients of the potential.