Combining fixpoint and differentiation theory

Zeinab Galal, Jean-Simon Pacaud Lemay
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Abstract

Interactions between derivatives and fixpoints have many important applications in both computer science and mathematics. In this paper, we provide a categorical framework to combine fixpoints with derivatives by studying Cartesian differential categories with a fixpoint operator. We introduce an additional axiom relating the derivative of a fixpoint with the fixpoint of the derivative. We show how the standard examples of Cartesian differential categories where we can compute fixpoints provide canonical models of this notion. We also consider when the fixpoint operator is a Conway operator, or when the underlying category is closed. As an application, we show how this framework is a suitable setting to formalize the Newton-Raphson optimization for fast approximation of fixpoints and extend it to higher order languages.
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结合定点理论和微分理论
导数与定点之间的相互作用在计算机科学和数学领域都有许多重要应用。在本文中,我们通过研究带有定点算子的笛卡尔微分范畴,为定点与导数的结合提供了一个分类框架。我们引入了一个关于定点导数与导数的定点的附加公理。我们展示了可以计算定点的笛卡尔微分范畴的标准范例是如何提供这一概念的典型模型的。我们还考虑了当定点算子是康威算子时,或者当底层范畴是封闭的时。作为应用,我们展示了这一框架是如何为快速逼近定点而形式化牛顿-拉夫逊优化并将其扩展到高阶语言的合适环境。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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