Square functions for Ritt operators on noncommutative Lp-spaces

Abstract

For any Ritt operator T acting on a noncommutative Lp-space, we define the notion of completely bounded functional calculus H∞(Bγ) where Bγ is a Stolz domain. Moreover, we introduce the `column square functions' xT,c,α=(Σk=1+∞k2α-1|Tk-1(I-T)α(x)|2)1/2Lp(M) and the `row square functions' xT,r,α=(Σk=1+∞k2α-1 |(Tk-1(I-T)α(x))*|2)1/2Lp(M) for any α>0 and any x∈ Lp(M). Then, we provide an example of Ritt operator which admits a completely bounded H∞(Bγ) functional calculus for some γ ∈ ]0,π2[ such that the square functions ·T,c,α and ·T,r,α are not equivalent. Moreover, assuming 1<p<2 and α>0, we prove that if (I-T) is dense and T admits a completely bounded H∞(Bγ) functional calculus for some γ ∈ ]0,π2[ then there exists a positive constant C such that for any x ∈ Lp(M), there exists x1, x2 ∈ Lp(M) satisfying x=x1+x2 and x1T,c,α+x2T,r,α≤ C xLp(M). Finally, we observe that this result applies to a suitable class of selfadjoint Markov maps on noncommutative Lp-spaces.