New properties of the multivariable H∞ functional calculus of sectorial operators

Abstract

This paper is devoted to the multivariable H∞ functional calculus associated with a finite commuting family of sectorial operators on Banach space. First we prove that if (A1,…, Ad) is such a family, if Ak is R-sectorial of R-type ωk∈(0,π), k=1,…,d, and if (A1,…, Ad) admits a bounded H∞(θ1× ·s×θd) joint functional calculus for some θk∈ (ωk,π), then it admits a bounded H∞(θ1× ·s×θd) joint functional calculus for all θk∈ (ωk,π), k=1,…,d. Second we introduce square functions adapted to the multivariable case and extend to this setting some of the well-known one-variable results relating the boundedness of H∞ functional calculus to square function estimates. Third, on K-convex reflexive spaces, we establish sharp dilation properties for d-tuples (A1,…, Ad) which admit a bounded H∞(θ1× ·s×θd) joint functional calculus for some θk<π2.