Coherent and Strongly Discrete Rings in Type Theory

机译：型理论中的相干和强烈离散环

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We present a formalization of coherent and strongly discrete rings in type theory. This is a fundamental structure in constructive algebra that represents rings in which it is possible to solve linear systems of equations. These structures have been instantiated with Bézout domains (for instance ? and k[x]) and Prüfer domains (generalization of Dedekind domains) so that we get certified algorithms solving systems of equations that are applicable on these general structures. This work can be seen as basis for developing a formalized library of linear algebra over rings.

机译：我们在理论中表现了相干和强烈离散环的形式化。这是建设性代数中的基本结构，其代表着振铃，其中可以解决方程的线性系统。这些结构已经使用Bézout域（例如？和K [X]）和PRÜFER域（Dedekind域的泛化），以便我们获得适用于这些一般结构的方程式的认证算法。这项工作可以被视为在环中开发正式的线性代数库的基础。

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《International Conference on Certified Programs and Proofs》|2012年||共16页
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Thierry Coquand; Anders M?rtberg; Vincent Siles;
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中图分类 TP301.6-532;
关键词
Formalization of mathematics; Constructive algebra; Coq; SSReflect;

机译：数学形式化;建设性代数;COQ;SSREFLECT;

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Coherent and Strongly Discrete Rings in Type Theory

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