Gerstenhaber-Batalin-Vilkovisky代数的Koszul-Tate型解析

Pub Date : 2018-10-25 DOI:10.1007/s40062-018-0218-2

Jeehoon Park, Donggeon Yhee

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引用次数: 0

摘要

Tate给出了一种明确的灭除可交换诺瑟环R上的可交换微分梯度代数的非平凡同调类的方法(ei J Math 1:14-27, 1957)。本文的目标是将他的结果推广到GBV (Gerstenhaber-Batalin-Vilkovisky)代数的情况，更一般地说，后代\(L_\infty \) -代数。更准确地说，对于给定的GBV代数\((\mathcal {A}=\oplus _{m\ge 0}\mathcal {A}_m, \delta , \ell _2^\delta )\)，我们提供了另一个显式GBV代数\((\widetilde{\mathcal {A}}=\oplus _{m\ge 0}\widetilde{\mathcal {A}}_m, \widetilde{\delta }, \ell _2^{\widetilde{\delta }})\)，使得它的总同调与给定GBV代数\((\mathcal {A}, \delta , \ell _2^\delta )\)的同调\(H_0(\mathcal {A}, \delta )\)的零次部分相同。

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The Koszul–Tate type resolution for Gerstenhaber–Batalin–Vilkovisky algebras

Tate provided an explicit way to kill a nontrivial homology class of a commutative differential graded algebra over a commutative noetherian ring R in Tate (Ill J Math 1:14–27, 1957). The goal of this article is to generalize his result to the case of GBV (Gerstenhaber–Batalin–Vilkovisky) algebras and, more generally, the descendant \(L_\infty \)-algebras. More precisely, for a given GBV algebra \((\mathcal {A}=\oplus _{m\ge 0}\mathcal {A}_m, \delta , \ell _2^\delta )\), we provide another explicit GBV algebra \((\widetilde{\mathcal {A}}=\oplus _{m\ge 0}\widetilde{\mathcal {A}}_m, \widetilde{\delta }, \ell _2^{\widetilde{\delta }})\) such that its total homology is the same as the degree zero part of the homology \(H_0(\mathcal {A}, \delta )\) of the given GBV algebra \((\mathcal {A}, \delta , \ell _2^\delta )\).

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