2011
DOI: 10.1112/blms/bdr110
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Composition operators on Hardy spaces of a half-plane

Abstract: We prove that a composition operator is bounded on the Hardy space H2 of the right half‐plane if and only if the inducing map fixes the point at infinity non‐tangentially, and has a finite angular derivative λ there. In this case the norm, essential norm and spectral radius of the operator are all equal to λ.

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Cited by 47 publications
(42 citation statements)
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“…That (1) ⇒ (2) is of course trivial, and we have already seen as a special case of Proposition 3.2 that (2) implies r is inner. By Corollary 3.5 in [3], we see that the second condition in (3) is equivalent to the statement that C r has norm 1. Since C n r = C r n for composition operators on the half plane, again by Corollary 3.5 in [3], if C r = 1, we would have a sequence f n ∈ H p (C + ) with each f n having norm 1 such that C n r f n → ∞ or C n r f n → 0 as n → ∞, which would contradict the Szőkefalvi-Nagy condition (Theorem 3.1).…”
Section: Results For Composition Operators On the Half Planementioning
confidence: 96%
“…That (1) ⇒ (2) is of course trivial, and we have already seen as a special case of Proposition 3.2 that (2) implies r is inner. By Corollary 3.5 in [3], we see that the second condition in (3) is equivalent to the statement that C r has norm 1. Since C n r = C r n for composition operators on the half plane, again by Corollary 3.5 in [3], if C r = 1, we would have a sequence f n ∈ H p (C + ) with each f n having norm 1 such that C n r f n → ∞ or C n r f n → 0 as n → ∞, which would contradict the Szőkefalvi-Nagy condition (Theorem 3.1).…”
Section: Results For Composition Operators On the Half Planementioning
confidence: 96%
“…In [7] it is shown that a composition operator C ϕ on H 2 (C + ) is bounded if and only if n.t.lim z→∞ ϕ(z) = ∞ and λ := n.t.lim z→∞ z/ϕ(z) exists (the angular derivative) with 0 < λ < ∞. Here n.t.lim denotes the nontangential limit, taken with z restricted to the sector …”
Section: Weighted Composition Operatorsmentioning
confidence: 99%
“…While boundedness of composition operators on H 2 .… C / was characterized in terms of Carleson measures [9], that criterion is considered hard to use in practice and so, a practical boundedness criterion, the norm, essential norm, and spectral radius formulas can be found in [5] (see also [12]): …”
Section: Invertible Composition Operatorsmentioning
confidence: 99%