Wilkie, A.J.
(2007)
*Some local definability theory for holomorphic functions.*
Modnet.

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## Abstract

Let \mathcal{F} be a collection of holomorphic functions and let \mathbb{R}(PR(\mathcal{F})) denote the reduct of the structure \mathbb{R}_{an} to the ordered field operations together with the set of proper restrictions (see below) of the real and imaginary parts of all functions in \mathcal{F}. We ask the question: Which holomorphic functions are locally definable (ie have their real and imaginary parts locally definable) in the structure \mathbb{R}(PR(\mathcal{F}))? It is easy to see that the collection of all such functions is closed under composition, partial differentiation, implicit definability (via the Implicit Function Theorem in one dependent variable) and Schwarz Reflection. We conjecture that this exhausts the possibilities and we prove as much in the neighbourhood of generic points. More precisely, we show that these four operations determine the natural pregeometry associated with \mathbb{R}(PR(\mathcal{F}))-definable, holomorphic functions.

Item Type: | Other |
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Subjects: | MSC 2010, the AMS's Mathematics Subject Classification > 03 Mathematical logic and foundations MSC 2010, the AMS's Mathematics Subject Classification > 11 Number theory |

Depositing User: | Ms Lucy van Russelt |

Date Deposited: | 21 Nov 2007 |

Last Modified: | 20 Oct 2017 14:12 |

URI: | https://eprints.maths.manchester.ac.uk/id/eprint/943 |

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