确定某些度数中的第五星形代数转移

Nguyen Sum
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引用次数: 0

摘要

设 $P_k$ 是素域 $\mathbb F_2$ 上的分级多项式代数 $/mathbbF_2[x_1,x_2,\ldots,x_k]$,它有两个元素,每个变量 $x_i$ 的度数为 1,并设 $GL_k$ 是 $\mathbb F_2$ 上的一般线性群,它以通常的方式作用于 $P_k$。代数 $P_k$ 被视为模 2 Steenrod 代数 $\mathcal A$ 上的一个模块。1989年,辛格[22]定义了$k$-th同调代数转移,它是一个同态 $$\varphi_k :(\mathbb F_2,\mathbbF_2) 到 (\mathbb F_2\otimes_{mathcal A}P_k)_d^{GL_k}$ 从 mod-2 Steenrod 代数 $\mbox{Tor}^{\mathcal A}_{k、k+d} (\mathbbF_2,\mathbb F_2)$ 到 $\mathbb F_2\otimes_{mathcalA}P_k)_d^{GL_k}$ 的子空间 $(\mathbb F_2\otimes_{mathcalA}P_k)_d^{GL_k}$ 由所有度数为 $d$ 的 $GL_k$ 不变类组成。本文利用彼得森命中问题的结果,证明了秩为五的辛格代数转移在内部度数 $d=20$ 和 $d=30$ 中是同构的。我们的结果驳斥了 Ph\'uc [17] 中对 $d=20$ 情况的证明。
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Determination of the fifth Singer algebraic transfer in some degrees
Let $P_k$ be the graded polynomial algebra $\mathbb F_2[x_1,x_2,\ldots ,x_k]$ over the prime field $\mathbb F_2$ with two elements and the degree of each variable $x_i$ being 1, and let $GL_k$ be the general linear group over $\mathbb F_2$ which acts on $P_k$ as the usual manner. The algebra $P_k$ is considered as a module over the mod-2 Steenrod algebra $\mathcal A$. In 1989, Singer [22] defined the $k$-th homological algebraic transfer, which is a homomorphism $$\varphi_k :{\rm Tor}^{\mathcal A}_{k,k+d} (\mathbb F_2,\mathbb F_2) \to (\mathbb F_2\otimes_{\mathcal A}P_k)_d^{GL_k}$$ from the homological group of the mod-2 Steenrod algebra $\mbox{Tor}^{\mathcal A}_{k,k+d} (\mathbb F_2,\mathbb F_2)$ to the subspace $(\mathbb F_2\otimes_{\mathcal A}P_k)_d^{GL_k}$ of $\mathbb F_2{\otimes}_{\mathcal A}P_k$ consisting of all the $GL_k$-invariant classes of degree $d$. In this paper, by using the results of the Peterson hit problem we present the proof of the fact that the Singer algebraic transfer of rank five is an isomorphism in the internal degrees $d= 20$ and $d = 30$. Our result refutes the proof for the case of $d=20$ in Ph\'uc [17].
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