Definability of complex functions in o-minimal structures
Abstract: We prove that some holomorphic continuations of functions in the classes $\mathbf{an}*$ and $\mathcal{G}$ are definable in the o-minimal structures $\mathbb{R}{\mathrm{an}*}$ and $\mathbb{R}{\mathcal{G}}$ 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 $\zeta$ function is definable in o-minimal expansions of $\mathbb{R}{\mathrm{an}*,\exp}$ and on which the $\Gamma$ function is definable in o-minimal expansions of $\mathbb{R}{\mathcal{G},\exp}$.
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