Identities for Whitehead products and infinite sums

Jeremy Brazas
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Abstract

Whitehead products and natural infinite sums are prominent in the higher homotopy groups of the $n$-dimensional infinite earring space $\mathbb{E}_n$ and other locally complicated Peano continua. In this paper, we derive general identities for how these operations interact with each other. As an application, we consider a shrinking-wedge $X$ of $(n-1)$-connected finite CW-complexes $X_1,X_2,X_3,\dots$ and compute the infinite-sum closure $\mathcal{W}_{2n-1}(X)$ of the set of Whitehead products $[\alpha,\beta]$ in $\pi_{2n-1}\left(X\right)$ where $\alpha,\beta\in\pi_n(X)$ are represented in respective sub-wedges that meet only at the basepoint. In particular, we show that $\mathcal{W}_{2n-1}(X)$ is canonically isomorphic to $\prod_{j=1}^{\infty}\left(\pi_{n}(X_j)\otimes \prod_{k>j}\pi_n(X_k)\right)$. The insight provided by this computation motivates a conjecture about the isomorphism type of the elusive groups $\pi_{2n-1}(\mathbb{E}_n)$, $n\geq 2$.
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怀特海积和无穷和的同一性
白头积和自然无限和在 $n$ 维无限耳空间 $\mathbb{E}_n$ 和其他局部复杂的皮亚诺连续体的高同调群中非常突出。在本文中,我们推导出这些运算如何相互作用的一般特性。在应用中,我们考虑由 $(n-1)$ 连接的有限 CW 复数 $X_1,X_2,X_3,\dots$组成的收缩楔 $X$,并计算白石乘积集合 $[\alpha、\beta]$在$\pi_{2n-1}\left(X\right)$中,其中$\alpha,\beta\in\pi_n(X)$表示仅在基点处相遇的子边。特别地,我们证明 $\mathcal{W}_{2n-1}(X)$ 与 $prod_{j=1}^{\infty}\left(\pi_{n}(X_j)\otimes \prod_{k>j}\pi_n(X_k)\right)$具有同构性。这个计算所提供的洞察力激发了关于难以捉摸的群 $\pi_{2n-1}(\mathbb{E}_n)$, $n\geq 2$ 的同构类型的猜想。
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