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Defant, Andreas and García, Domingo and Maestre, Manuel and Pérez García, David
(2008)
*Bohr's strip for vector valued Dirichlet series.*
Mathematische Annalen, 342
(3).
pp. 533-555.
ISSN 0025-5831

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Official URL: http://www.springerlink.com/content/a3k0122058uw8228/fulltext.pdf

## Abstract

Bohr showed that the width of the strip (in the complex plane) on which a given Dirichlet series Sigma a(n)/n(s), s is an element of C, converges uniformly but not absolutely, is at most 1/2, and Bohnenblust-Hille that this bound in general is optimal. We prove that for a given infinite dimensional Banach space Y the width of Bohr's strip for a Dirichlet series with coefficients a(n) in Y is bounded by 1 - 1/Cot (Y), where Cot (Y) denotes the optimal cotype of Y. This estimate even turns out to be optimal, and hence leads to a new characterization of cotype in terms of vector valued Dirichlet series.

Item Type: | Article |
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Subjects: | Sciences > Mathematics > Functional analysis and Operator theory |

ID Code: | 17787 |

Deposited On: | 21 Jan 2013 11:28 |

Last Modified: | 18 Feb 2019 12:19 |

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