Polygonal functional calculus for operators with finite peripheral spectrum

Abstract

Let T X X be a bounded operator on Banach space, whose spectrum σ(T) is included in the closed unit disc D. Assume that the peripheral spectrum σ(T) T is finite and that T satisfies a resolvent estimate (z-T)-1 \ z --1\, :\,∈ σ(T) T\, z∈ Dc. We prove that T admits a bounded polygonal functional calculus, that is, an estimate φ(T) \φ(z)\, :\, z∈\ for some polygon ⊂ D and all polynomials φ, in each of the following two cases : (i) either X=Lp for some 1<p<∞, and T Lp Lp is a positive contraction; (ii) or T is polynomially bounded and for all ∈ σ(T) T, there exists a neighborhood V of such that the set \(-z)(z-T)-1\, :\, z∈ V Dc\ is R-bounded (here X is arbitrary). Each of these two results extends a theorem of de Laubenfels concerning polygonal functional calculus on Hilbert space. Our investigations require the introduction, for any finite set E⊂ T, of a notion of RittE operator which generalises the classical notion of Ritt operator. We study these RittE operators and their natural functional calculus.