Spectra of linear fractional composition operators on the Hardy and weighted Bergman spaces of the half-plane

Abstract: Abstract. We compute the spectra and the essential spectra of bounded linear fractional composition operators acting on the Hardy and weighted Bergman spaces of the upper halfplane. We are also able to extend the results to weighted Dirichlet spaces of the upper halfplane. IntroductionThe Boundedness of a composition operator C τ on the Hardy or the weighted Bergman spaces of the half-plane has been proved to be equivalent with the angular derivative of the inducing map at infinity, denoted by τ ′ (∞), being f… Show more

“…We will answer this question affirmatively in the second section. Among composition operators, those induced by linear fractional transformations are well understood in several backgrounds, including the unit disk [3,5,6,[12][13][14]16] and the upper half-plane [11,20]. Recall that a linear fractional transformation (LFT) is a meromorphic bijection of the extended complex plane C ∪ {∞} onto itself, which can be expressed in the form…”

“…For details, see Sharpiro's book [21] or the article [12]. Recently, Schroderus [20] considered the spectrum problem of a linear fractional composition operator on H 2 (Π + ) and A 2 α (Π + ) and got a complete solution. Schroderus's result extended some earlier work of Gallardo-Gutiérrez and Montes-Rodríguez [11].…”

“…Taking the notation from [20] for the weighted Bergman space A 2 γ (Π + ), γ > −1, we associate A 2 −1 (Π + ) = H 2 (Π + ) and let K γ w be the reproducing kernel for…”

“…Obviously, ϕ is an automorphism of the upper half-plane when Im w 0 = 0. In this case, the author in [20] obtained the spectrum of C ϕ on the Hardy and weighted Bergman space of the upper half-plane by performing the Fourier transform to convert C ϕ into some multiplier on a certain L 2 space (Paley-Wiener theorem). The method cannot be applied to the growth space.…”

Spectra of Linear Fractional Composition Operators on the Growth Space and Bloch Space of the Upper Half-Plane

“…We will answer this question affirmatively in the second section. Among composition operators, those induced by linear fractional transformations are well understood in several backgrounds, including the unit disk [3,5,6,[12][13][14]16] and the upper half-plane [11,20]. Recall that a linear fractional transformation (LFT) is a meromorphic bijection of the extended complex plane C ∪ {∞} onto itself, which can be expressed in the form…”

“…For details, see Sharpiro's book [21] or the article [12]. Recently, Schroderus [20] considered the spectrum problem of a linear fractional composition operator on H 2 (Π + ) and A 2 α (Π + ) and got a complete solution. Schroderus's result extended some earlier work of Gallardo-Gutiérrez and Montes-Rodríguez [11].…”

“…Taking the notation from [20] for the weighted Bergman space A 2 γ (Π + ), γ > −1, we associate A 2 −1 (Π + ) = H 2 (Π + ) and let K γ w be the reproducing kernel for…”

“…Obviously, ϕ is an automorphism of the upper half-plane when Im w 0 = 0. In this case, the author in [20] obtained the spectrum of C ϕ on the Hardy and weighted Bergman space of the upper half-plane by performing the Fourier transform to convert C ϕ into some multiplier on a certain L 2 space (Paley-Wiener theorem). The method cannot be applied to the growth space.…”

Spectra of Linear Fractional Composition Operators on the Growth Space and Bloch Space of the Upper Half-Plane

Dynamics for Linear Fractional Composition Operator on $$H^{2}(\mathbb {C}_{+})$$

Spectra of Weighted Composition Operators on Analytic Function Spaces