On measuring unboundedness of the H∞-calculus for generators of analytic semigroups

Abstract

We investigate the boundedness of the H∞-calculus by estimating the bound b() of the mapping H∞→ B(X): f f(A)T() for near zero. Here, -A generates the analytic semigroup T and H∞ is the space of bounded analytic functions on a domain strictly containing the spectrum of A. We show that b()=O(||) in general, whereas b()=O(1) for bounded calculi. This generalizes a result by Vitse and complements work by Haase and Rozendaal for non-analytic semigroups. We discuss the sharpness of our bounds and show that single square function estimates yield b()=O(||).