有理映射空间的自闭数

Pub Date : 2023-10-11 DOI:10.1007/s40062-023-00332-3
Yichen Tong
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引用次数: 0

摘要

对于2n维的闭连通定向流形M, Møller和Raussen证明了M到\(S^{2n}\)的映射空间的分量具有两种不同的有理同伦类型。然而,由于这一结果是由分量的代数模型证明的,所以其他同伦不变量是否区分它们的有理同伦类型尚不清楚。连通CW复形的自闭数是最小的整数k,使得它在\(\pi _*\)中对\(*\le k\)诱导同构的任何自映射都是同伦等价的,迄今为止在映射空间的分量上还没有结果。对于具有有限\(\pi _1\)的2n维有理poincar复X,我们利用Brown-Szczarba模型完全确定了从X到\(S^{2n}\)的映射空间的有理分量的自封闭数。作为推论,我们证明了自闭数确实能区分分量的有理同伦类型。由于封闭连通的定向流形是一个有理poincar复合体,我们的结果部分推广了Møller和Raussen的结果。
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Self-closeness numbers of rational mapping spaces

For a closed connected oriented manifold M of dimension 2n, it was proved by Møller and Raussen that the components of the mapping space from M to \(S^{2n}\) have exactly two different rational homotopy types. However, since this result was proved by the algebraic models for the components, it is unclear whether other homotopy invariants distinguish their rational homotopy types or not. The self-closeness number of a connected CW complex is the least integer k such that any of its self-maps inducing an isomorphism in \(\pi _*\) for \(*\le k\) is a homotopy equivalence, and there is no result on the components of mapping spaces so far. For a rational Poincaré complex X of dimension 2n with finite \(\pi _1\), we completely determine the self-closeness numbers of the rationalized components of the mapping space from X to \(S^{2n}\) by using their Brown–Szczarba models. As a corollary, we show that the self-closeness number does distinguish the rational homotopy types of the components. Since a closed connected oriented manifold is a rational Poincaré complex, our result partially generalizes that of Møller and Raussen.

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