算子几何切线范畴的差分束

IF 0.6 4区 数学 Q3 MATHEMATICS
Marcello Lanfranchi
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引用次数: 0

摘要

仿射方案可以被理解为交换代数和单价代数范畴的相反对象。同样,(\mathscr {P}\)-affine 方案也可以定义为操作数\(\mathscr {P}\)上的代数范畴的相反范畴的对象。关联代数范畴的相反范畴就是一个例子。一个运算元的运算方案范畴带有一个正切结构。本文旨在通过这一切线范畴来启动对运算仿射方案几何的研究。例如,我们希望通过关联代数范畴反面的切分结构来描述代数非交换几何。为了启动这样一个计划,第一步是对微分束进行分类,微分束是微分几何中向量束的类似物。在本文中,我们证明了在\(\mathscr {P}^{(A)}\) -仿射方案 A 上的封厣\(\mathscr {P}^{(A)}\) 的仿射方案的切范畴正是在 A 上的\(\mathscr {P}\)-仿射方案的切范畴。我们将利用这个结果来证明在一个 \(\mathscr {P}\)-affine 方案 A 上的微分束正是操作数意义上的 A 模块。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

The Differential Bundles of the Geometric Tangent Category of an Operad

The Differential Bundles of the Geometric Tangent Category of an Operad

Affine schemes can be understood as objects of the opposite of the category of commutative and unital algebras. Similarly, \(\mathscr {P}\)-affine schemes can be defined as objects of the opposite of the category of algebras over an operad \(\mathscr {P}\). An example is the opposite of the category of associative algebras. The category of operadic schemes of an operad carries a canonical tangent structure. This paper aims to initiate the study of the geometry of operadic affine schemes via this tangent category. For example, we expect the tangent structure over the opposite of the category of associative algebras to describe algebraic non-commutative geometry. In order to initiate such a program, the first step is to classify differential bundles, which are the analogs of vector bundles for differential geometry. In this paper, we prove that the tangent category of affine schemes of the enveloping operad \(\mathscr {P}^{(A)}\) over a \(\mathscr {P}\)-affine scheme A is precisely the slice tangent category over A of \(\mathscr {P}\)-affine schemes. We are going to employ this result to show that differential bundles over a \(\mathscr {P}\)-affine scheme A are precisely A-modules in the operadic sense.

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来源期刊
CiteScore
1.30
自引率
16.70%
发文量
29
审稿时长
>12 weeks
期刊介绍: Applied Categorical Structures focuses on applications of results, techniques and ideas from category theory to mathematics, physics and computer science. These include the study of topological and algebraic categories, representation theory, algebraic geometry, homological and homotopical algebra, derived and triangulated categories, categorification of (geometric) invariants, categorical investigations in mathematical physics, higher category theory and applications, categorical investigations in functional analysis, in continuous order theory and in theoretical computer science. In addition, the journal also follows the development of emerging fields in which the application of categorical methods proves to be relevant. Applied Categorical Structures publishes both carefully refereed research papers and survey papers. It promotes communication and increases the dissemination of new results and ideas among mathematicians and computer scientists who use categorical methods in their research.
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