球上 $\mathbb{E}_n$ 算法和共链的形式性

Gijs Heuts, Markus Land
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引用次数: 0

摘要

我们研究了增$\mathbb{E}_n$-代数范畴上的循环和悬浮函数。其中一个应用是 $n$ 球的共链代数的形式化。我们证明它作为$\mathbb{E}_n$代数是形式的,在一般交换环谱中也有系数,但除非系数是有理的,否则很少是$\mathbb{E}_{n+1}$形式的。在此过程中,我们证明了从谱中的操作数到谱中的单子的自由函子在一个很好的操作数子类上是完全忠实的,这个子类尤其包含有限 $n$ 的稳定 $\mathbb{E}_n$ 操作数。我们将用它来解释我们用操作数术语解释增强代数的循环和悬浮函子的结果。
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Formality of $\mathbb{E}_n$-algebras and cochains on spheres
We study the loop and suspension functors on the category of augmented $\mathbb{E}_n$-algebras. One application is to the formality of the cochain algebra of the $n$-sphere. We show that it is formal as an $\mathbb{E}_n$-algebra, also with coefficients in general commutative ring spectra, but rarely $\mathbb{E}_{n+1}$-formal unless the coefficients are rational. Along the way we show that the free functor from operads in spectra to monads in spectra is fully faithful on a nice subcategory of operads which in particular contains the stable $\mathbb{E}_n$-operads for finite $n$. We use this to interpret our results on loop and suspension functors of augmented algebras in operadic terms.
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