\({ \mathsf {TQ} }\)-补全和恒等函子的泰勒塔

IF 0.7 4区数学 Q2 MATHEMATICS Journal of Homotopy and Related Structures Pub Date : 2022-03-30 DOI:10.1007/s40062-022-00303-0

Nikolas Schonsheck

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引用次数: 2

摘要

本文的目的是研究谱中操作代数下恒等函子泰勒塔的收敛性。具体地说，我们证明如果A是一个具有0连通\({ \mathsf {TQ} }\) -同调谱\({ \mathsf {TQ} }(A)\)的\((-1)\) -连通\({ \mathcal {O} }\) -代数，那么在A上求值的恒等函子的泰勒塔极限与A的\({ \mathsf {TQ} }\) -补全之间存在一个自然弱等价\(P_\infty ({ \mathrm {id} })A \simeq A^\wedge _{ \mathsf {TQ} }\)。这个结果将恒等式泰勒塔的知识扩展到它的“收敛半径”之外。

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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\({ \mathsf {TQ} }\)-completion and the Taylor tower of the identity functor

The goal of this short paper is to study the convergence of the Taylor tower of the identity functor in the context of operadic algebras in spectra. Specifically, we show that if A is a \((-1)\)-connected \({ \mathcal {O} }\)-algebra with 0-connected \({ \mathsf {TQ} }\)-homology spectrum \({ \mathsf {TQ} }(A)\), then there is a natural weak equivalence \(P_\infty ({ \mathrm {id} })A \simeq A^\wedge _{ \mathsf {TQ} }\) between the limit of the Taylor tower of the identity functor evaluated on A and the \({ \mathsf {TQ} }\)-completion of A. Since, in this context, the identity functor is only known to be 0-analytic, this result extends knowledge of the Taylor tower of the identity beyond its “radius of convergence.”

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来源期刊

Journal of Homotopy and Related Structures MATHEMATICS-

CiteScore

1.20

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： Journal of Homotopy and Related Structures (JHRS) is a fully refereed international journal dealing with homotopy and related structures of mathematical and physical sciences. Journal of Homotopy and Related Structures is intended to publish papers on Homotopy in the broad sense and its related areas like Homological and homotopical algebra, K-theory, topology of manifolds, geometric and categorical structures, homology theories, topological groups and algebras, stable homotopy theory, group actions, algebraic varieties, category theory, cobordism theory, controlled topology, noncommutative geometry, motivic cohomology, differential topology, algebraic geometry.

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