Definability of complex functions in o-minimal structures
Abstract
We prove that some holomorphic continuations of functions in the classes an* and G are definable in the o-minimal structures Ran* and RG respectively. More specifically, we give complex domains on which the holomorphic continuations are definable, and show they are optimal. As an application, we describe optimal domains on which the Riemann ζ function is definable in o-minimal expansions of Ran*, and on which the function is definable in o-minimal expansions of RG,.
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