Spectral multiplier theorems via H∞ calculus and R-bounds

Abstract

We prove spectral multiplier theorems for H\"ormander classes Hα\p for 0-sectorial operators A on Banach spaces assuming a bounded H∞(\σ) calculus for some σ ∈ (0,π) and norm and certain R-bounds on one of the following families of operators: the semigroup e--zA on C\+, the wave operators eisA for s ∈ R, the resolvent (λ -- A)-1 on C R, the imaginary powers Ait for t ∈ R or the Bochner-Riesz means (1-A/u)α\+ for u > 0. In contrast to the existing literature we neither assume that A operates on an Lp scale nor that A is self-adjoint on a Hilbert space. Furthermore, we replace (generalized) Gaussian or Poisson bounds and maximal estimates by the weaker notion of R-bounds, which allow for a unified approach to spectral multiplier theorems in a more general setting. In this setting our results are close to being optimal. Moreover, we can give a characterization of the (R-bounded) Hα\1 calculus in terms of R-boundedness of Bochner-Riesz means.