映射空间的相对Gottlieb群及其有理上同调

Q3 Mathematics Proceedings of the International Geometry Center Pub Date : 2022-05-10 DOI:10.15673/tmgc.v15i1.2196

A. Zaim

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引用次数: 0

摘要

设f:X→Y是有限型单连通cw -复形的映射。设maxπ★(Y)⊗Q = max{i | πi(Y)⊗Q≠0}。本文计算了当X是f0空间，Y是奇球积时f的相对Gottlieb群。同样，在合理的假设下，当X是奇球积，Y是f0空间时，我们确定了这些群。因此，我们证明了与f相关的有理g序列分裂成一个短的精确序列。最后证明了当maxπ★(Y)⊗Q为偶时，映射(X,Y;f)的有理上同调是无限维的。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Relative Gottlieb groups of mapping spaces and their rational cohomology

Let f:X →Y be a map of simply connected CW-complexes of finite type. Put maxπ★(Y)⊗Q = max{ i | πi(Y)⊗Q≠0 }. In this paper we compute the relative Gottlieb groups of f when X is an F0-space and Y is a product of odd spheres. Also, under reasonable hypothesis, we determine these groups when X is a product of odd spheres and Y is an F0-space. As a consequence, we show that the rationalized G-sequence associated to f splits into a short exact sequence. Finally, we prove that the rational cohomology of map(X,Y;f) is infinite dimensional whenever maxπ★(Y)⊗Q is even.

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