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arxiv: 1901.09574 · v1 · pith:UT6HDEZ5new · submitted 2019-01-28 · 🧮 math.AG · cs.SC· math.NT

Gr{\"o}bner bases over Tate algebras

classification 🧮 math.AG cs.SCmath.NT
keywords algebrastatebasesbnergeometryplayalgebraicalgorithm
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Tate algebras are fundamental objects in the context of analytic geometry over the p-adics. Roughly speaking, they play the same role as polynomial algebras play in classical algebraic geometry. In the present article, we develop the formalism of Gr{\"o}bner bases for Tate algebras. We prove an analogue of the Buchberger criterion in our framework and design a Buchberger-like and a F4-like algorithm for computing Gr{\"o}bner bases over Tate algebras. An implementation in SM is also discussed.

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