多元函数差

Robert Paré
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引用次数: 0

摘要

引入了一大类预子范畴之间的函数的部分差分算子,把我们的差分算子从 \cite{Par24} 扩展到多变量情况。它们结合成雅各布剖分器,为宽松的链式规则提供了环境。我们引入了多变量牛顿数列的函子版本,其目的是从迭代差分中恢复函子。并不是所有的函数都能复原,但我们得到了一个左邻接形式的最佳近似值,而且诱导的逗点是幂等的。它的定点就是我们所说的软解析函子,是菲奥雷等人的多变量解析函子的广义化。
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Multivariate functorial difference
Partial difference operators for a large class of functors between presheaf categories are introduced, extending our difference operator from \cite{Par24} to the multivariable case. These combine into the Jacobian profunctor which provides the setting for a lax chain rule. We introduce a functorial version of multivariable Newton series whose aim is to recover a functor from its iterated differences. Not all functors are recovered but we get a best approximation in the form of a left adjoint, and the induced comonad is idempotent. Its fixed points are what we call soft analytic functors, a generalization of the multivariable analytic functors of Fiore et al.~\cite{FioGamHylWin08}.
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Cyclic Segal Spaces Unbiased multicategory theory Multivariate functorial difference A Fibrational Theory of First Order Differential Structures A local-global principle for parametrized $\infty$-categories
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