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ON ODA’S PROBLEM AND SPECIAL LOCI
Part of
Benjamin Collas, Séverin Philip
Journal:

Journal of the Institute of Mathematics of Jussieu , First View

Published online by Cambridge University Press:

12 November 2024, pp. 1-37
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Oda’s problem, which deals with the fixed field of the universal monodromy representation of moduli spaces of curves and its independence with respect to the topological data, is a central question of anabelian arithmetic geometry. This paper emphasizes the stack nature of this problem by establishing the independence of monodromy fields with respect to finer special loci data of curves with symmetries, which we show provides a new proof of Oda’s prediction.

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