The A∞-structure of the index map

IF 0.5 Q3 MATHEMATICS Annals of K-Theory Pub Date : 2018-06-22 DOI:10.2140/AKT.2018.3.581
O. Braunling, M. Groechenig, J. Wolfson
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引用次数: 2

Abstract

Let $F$ be a local field with residue field $k$. The classifying space of $GL_n(F)$ comes canonically equipped with a map to the delooping of the $K$-theory space of $k$. Passing to loop spaces, such a map abstractly encodes a homotopy coherently associative map of A-infinity-spaces $GL_n(F)\to K_k$. Using a generalized Waldhausen construction, we construct an explicit model built for the $A_\infty$-structure of this map, built from nested systems of lattices in $F^n$. More generally, we construct this model in the framework of Tate objects in exact categories, with finite dimensional vector spaces over local fields as a motivating example.
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指数映射的A∞结构
设$F$为局部域,剩余域为$k$。$GL_n(F)$的分类空间通常配备了一个映射到$k$的$K$ -理论空间的发展。传递给循环空间,这样的映射抽象地编码了a -无穷空间的同伦相干关联映射$GL_n(F)\to K_k$。利用广义的Waldhausen构造,我们构造了一个明确的模型,该模型由$F^n$中嵌套的格系统构建而成,用于该地图的$A_\infty$ -结构。更一般地说,我们在精确类别的Tate对象框架中构建该模型,并以局部场上的有限维向量空间作为激励示例。
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来源期刊
Annals of K-Theory
Annals of K-Theory MATHEMATICS-
CiteScore
1.10
自引率
0.00%
发文量
12
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