Spectral multiplier theorems and averaged R-boundedness
arXiv:1407.0194
Abstract
Let $A$ be a $0$-sectorial operator with a bounded $H^\infty(Σ\_Ï)$-calculus for some $Ï\in (0,Ï),$ e.g. a Laplace type operator on $L^p(Ω),\: 1 < p < \infty,$ where $Ω$ is a manifold or a graph. We show that $A$ has a H{ö}rmander functional calculus if and only if certain operator families derived from the resolvent $(λ- A)^{-1},$ the semigroup $e^{-zA},$ the wave operators $e^{itA}$ or the imaginary powers $A^{it}$ of $A$ are $R$-bounded in an $L^2$-averaged sense. If $X$ is an $L^p(Ω)$ space with $1 \leq p < \infty,$ $R$-boundedness reduces to well-known estimates of square sums.
Error in the title corrected