Mittag-Leffler problems on Berkovich curves
Abstract
Given a quasi-smooth Berkovich curve X admitting a finite triangulation, finitely many disjoint open annuli A1,…,An in X that are not precompact, and for each i=1,…, n, an analytic function fi (resp. differential form σi) convergent on Ai, we provide a criterion for when there exists an analytic function f (resp. a differential form σ) on X inducing the functions fi (resp. differentials σi). Along the way we reprove residue theorem for differentials on smooth Berkovich curves that admit finite triangulations.
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