H∞ calculus for submarkovian semigroups on weighted L2 spaces

Abstract

Let (Tt)t ≥ 0 be a markovian (resp. submarkovian) semigroup on some σ-finite measure space (,μ). We prove that its negative generator A has a bounded H∞(θ) calculus on the weighted space L2(,wdμ) as long as the weight w : (0,∞) has finite characteristic defined by QA2(w) = t > 0 \| Tt(w) Tt (w-1 ) \|L∞() (resp. by a variant for submarkovian semigroups). Some additional technical conditions on the semigroup have to be imposed and their validity in examples is discussed. Any angle θ > π2 is admissible in the above H∞ calculus, and for some semigroups also certain θ = θw < π2 depending on the size of QA2(w). The norm of the H∞(θ) calculus is linear in the QA2 characteristic for θ > π2. We also discuss negative results on angles θ < π2. Namely we show that there is a markovian semigroup on a probability space and a QA2 weight w without H\"ormander functional calculus on L2(,w dμ).