Spectral multiplier theorems and averaged R-boundedness

Abstract

Let A be a 0-sectorial operator with a bounded H∞(\σ)-calculus for some σ ∈ (0,π), e.g. a Laplace type operator on Lp(),\: 1 < p < ∞, where is a manifold or a graph. We show that A has a H\"ormander functional calculus if and only if certain operator families derived from the resolvent (λ - A)-1, the semigroup e-zA, the wave operators eitA or the imaginary powers Ait of A are R-bounded in an L2-averaged sense. If X is an Lp() space with 1 ≤ p < ∞, R-boundedness reduces to well-known estimates of square sums.