A sharp equivalence between H∞ functional calculus and square function estimates

Abstract

Let Tt = e-tA be a bounded analytic semigroup on Lp, with 1<p<∞. It is known that if A and its adjoint A* both satisfy square function estimates (∫0∞| A1/2 Tt(x)|2\, dt\,)1/2Lp x and (∫0∞|A*1/2 Tt*(y)|2\, dt\,)1/2Lp' y for x in Lp and y in Lp', then A admits a bounded H∞(θ) functional calculus for any θ>π2. We show that this actually holds true for some θ<π2.