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Reduced Forms of Linear Differential Systems and the Intrinsic Galois-Lie Algebra of Katz

Generalizing the main result of [Aparicio-Monforte A., Compoint E., Weil J.-A., J. Pure Appl. Algebra 217 (2013), 1504-1516], we prove that a linear differential system is in reduced form in the sense of Kolchin and Kovacic if and only if any differential module in an algebraic construction admits a constant basis. Then we derive an explicit version of this statement. We finally deduce some properties of the Lie algebra of Katz's intrinsic Galois group.

preprint2020arXivOpen access
Moulay BarkatouThomas CluzeauLucia Di VizioJacques-Arthur Weil
math.AG
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Moulay BarkatouThomas CluzeauLucia Di VizioJacques-Arthur Weil

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