2014
DOI: 10.1016/j.jmaa.2013.12.053
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Isometric composition operators on the analytic Besov spaces

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Cited by 4 publications
(7 citation statements)
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“…Here, we rely on a proof by a special flavor that is due to Allen et.al. in [1], so we omitted the details. One of the tactics is used for using a fact that adjoint of a surjective isometry is also an isometry with the fact that the point estimates are really bounded linear functions.…”
Section: Isometries Of General Banach Spacementioning
confidence: 99%
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“…Here, we rely on a proof by a special flavor that is due to Allen et.al. in [1], so we omitted the details. One of the tactics is used for using a fact that adjoint of a surjective isometry is also an isometry with the fact that the point estimates are really bounded linear functions.…”
Section: Isometries Of General Banach Spacementioning
confidence: 99%
“…It goes without saying that W ψ,φ f is a generalization of C φ f = f • φ and multiplication operator M ψ f = ψ • f . The demeanor of these operators is extensively studied on numerous spaces of holomorphic functions (see for example [1,3,4,6,14,15,22] and others).…”
Section: Introductionmentioning
confidence: 99%
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“…In this section, we wish to characterize the isometries on the harmonic spaces B α H , A − α H , Z H , and B p H . For most of the corresponding analytic counterparts, namely, B α for α ≠ 1, A − α , Z, and B p for p > 1 and p ≠ 2, the only composition operators that are isometries are those induced by rotations [20][21][22][23] (see also [24]). Since an isometry on a harmonic space X H that extends an analytic space X is also an isometry on X, Proof.…”
Section: Isometries Of C φmentioning
confidence: 99%
“…It goes without saying that W ψ,φ f is a generalization of C φ f = f • φ and multiplication operator M ψ f = ψ • f . The demeanor of these operators is extensively studied on numerous spaces of holomorphic functions (see for example [1,3,4,6,14,15,22] and others).…”
Section: Introductionmentioning
confidence: 99%