Square functions associated with RittE operators
Abstract
For a subset E = \1, ..., N\ of the unit circle T, the notion of RittE operators on a Banach space and their functional calculus on generalized Stolz domains was developed and studied in arXiv:2203.05373. In this paper, we define a quadratic functional calculus for a RittE operator on Er, by a decomposition of type Franks-McIntosh. We show that with some hypothesis on the cotype of X, this notion is equivalent to the existence of a bounded functional calculus on Er. We define for a RittE operator on a Banach space X and for any positive real number α and for any x ∈ X xT,α = n→ ∞Σk=1n kα - 1/2 k Tk-1Πj=1N(I-jT)α(x) Rad(X) We show that, under the condition of finite cotype of X, a RittE operator admits a quadratic functional calculus if and only if the estimates xT,α x hold for both T and T*. We finally prove the equivalence between these square functions.
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