Bohr’s theorem for holomorphic mappings with values in homogeneous balls

Hamada, Hidetaka; Honda, Tatsuhiro; Kohr, Gabriela

doi:10.1007/s11856-009-0087-9

Cited by 50 publications

(33 citation statements)

References 20 publications

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“…In this paper, we will generalize Bohr's theorem to holomorphic mappings f : G → B Y , where G is a bounded balanced domain in a complex Banach space X , and B Y is the unit ball in a JB*‐triple Y . Our result is a slight generalization of a result in .…”

Section: Introductionsupporting

confidence: 81%

“…Then, Kaup showed

MathClass-rel∥ B {(a MathClass-punc, a)}^{MathClass-bin- 1 MathClass-bin/ 2} MathClass-rel∥ MathClass-rel= \frac{1}{1 MathClass-bin- MathClass-rel∥ a {MathClass-rel∥}^{2}}

in ,Corollary 3.6. In , the following lemma was proved for the unit ball of a J*‐algebra. We generalize the result in to the unit ball of a JB*‐triple.…”

Section: Bohr's Theoremmentioning

confidence: 99%

“…On the other hand, using homogeneous expansions of holomorphic functions, Aizenberg obtained another generalization of Bohr's theorem in ,Theorem 8; Liu and Wang gave a generalization of Bohr's theorem to holomorphic mappings of B into itself, where B is one of the four classical domains in

{double-struckC}^{n}

in . Hamada, Honda and Kohr generalized to infinite dimensional spaces in . We refer for other generalizations of Bohr's theorem to and .…”

Section: Introductionmentioning

confidence: 99%

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Some generalizations of Bohr's theorem

Hamada

Honda

2012

Math Methods in App Sciences

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Communicated by T. QianLet X be a complex Banach space and Y be a JB*-triple. Let G be a bounded balanced domain in X and B Y be the unit ball in Y. Let f : G ! B Y be a holomorphic mapping. In this paper, we obtain some generalization of Bohr's theorem that if a D f .0/, then we have P 1 kD0 kD' a .a/OED k f .0/.z k /k=.kŠkD' a .a/k/ < 1 for z 2 .1=3/G, where ' a 2 Aut.B Y / such that ' a .a/ D 0. Moreover, we show that the constant 1=3 is best possible. This result generalizes Bohr's theorem for the open unit disc in the complex plane C.

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Section: Introductionsupporting

confidence: 81%

“…Then, Kaup showed

MathClass-rel∥ B {(a MathClass-punc, a)}^{MathClass-bin- 1 MathClass-bin/ 2} MathClass-rel∥ MathClass-rel= \frac{1}{1 MathClass-bin- MathClass-rel∥ a {MathClass-rel∥}^{2}}

in ,Corollary 3.6. In , the following lemma was proved for the unit ball of a J*‐algebra. We generalize the result in to the unit ball of a JB*‐triple.…”

Section: Bohr's Theoremmentioning

confidence: 99%

{double-struckC}^{n}

in . Hamada, Honda and Kohr generalized to infinite dimensional spaces in . We refer for other generalizations of Bohr's theorem to and .…”

Section: Introductionmentioning

confidence: 99%

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Some generalizations of Bohr's theorem

Hamada

Honda

2012

Math Methods in App Sciences

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“…Finally, we prove a regularity theorem for linearly invariant families on B. All four types of classical Cartan domains are the open unit balls of JB * -triples, and the same holds for any finite product of these domains [22]; see also [23,24]. Thus the unit balls of JB * -triples are natural generalizations of the unit disc in C and we have a setting in which a large number of bounded symmetric homogeneous domains may be studied simultaneously.…”

Section: Introductionmentioning

confidence: 86%

Trace-order and a distortion theorem for linearly invariant families on the unit ball of a finite dimensional JB∗ -triple

Hamada

Honda

Kohr

2012

Journal of Mathematical Analysis and Applications

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a b s t r a c tWe give a distortion theorem for linearly invariant families on the unit ball B of a finite dimensional JB * -triple X by using the trace-order. The exponents in the distortion bounds depend on the Bergman metric at 0. Further, we introduce a new definition for the traceorder of a linearly invariant family on B, based on a Jacobian argument. We also construct an example of a linearly invariant family on B which has minimum trace-order and is not a subset of the normalized convex mappings of B for dim X ≥ 2. Finally, we prove a regularity theorem for linearly invariant families on B. All four types of classical Cartan domains are the open unit balls of JB * -triples, and the same holds for any finite product of these domains. Thus the unit balls of JB * -triples are natural generalizations of the unit disc in C and we have a setting in which a large number of bounded symmetric homogeneous domains may be studied simultaneously.

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“…Earlier results on the generalization of Bohr theorem using homogeneous expansions can also be found in [12,Theorem 8] and [14]. Meanwhile, the generalization of both the results [58] and [12,Theorem 8] was obtained by Hamada et al [49].…”

Section: Theorem 24mentioning

confidence: 80%

On the Bohr Inequality

Ali

Ponnusamy

2017

Springer Optimization and Its Applications

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The Bohr inequality, first introduced by Harald Bohr in 1914, deals with finding the largest radius r, 0 < r < 1, such that ∑ ∞ n=0 |a n |r n ≤ 1 holds whenever | ∑ ∞ n=0 a n z n | ≤ 1 in the unit disk D of the complex plane. The exact value of this largest radius, known as the Bohr radius, has been established to be 1/3. This paper surveys recent advances and generalizations on the Bohr inequality. It discusses the Bohr radius for certain power series in D, as well as for analytic functions from D into particular domains. These domains include the punctured unit disk, the exterior of the closed unit disk, and concave wedge-domains. The analogous Bohr radius is also studied for harmonic and starlike logharmonic mappings in D. The Bohr phenomenon which is described in terms of the Euclidean distance is further investigated using the spherical chordal metric and the hyperbolic metric. The exposition concludes with a discussion on the n-dimensional Bohr radius.

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Bohr’s theorem for holomorphic mappings with values in homogeneous balls

Cited by 50 publications

References 20 publications

Some generalizations of Bohr's theorem

Some generalizations of Bohr's theorem

Trace-order and a distortion theorem for linearly invariant families on the unit ball of a finite dimensional JB∗ -triple

On the Bohr Inequality

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