Homomorphic images and rationalizations based on the Eilenberg-Maclane spaces

Dae Woong Lee

doi:10.1007/s10587-005-0036-7

Homomorphic images and rationalizations based on the Eilenberg-Maclane spaces

Dae Woong Lee^*

^*Corresponding author for this work

Department of Mathematics

Research output: Contribution to journal › Journal article › peer-review

Abstract

Are there any kinds of self maps on the loop structure whose induced homomorphic images are the Lie brackets in tensor algebra? We will give an answer to this question by defining a self map of Ω∑K(ℤ, 2d), and then by computing efficiently some self maps. We also study the topological rationalization properties of the suspension of the Eilenberg-MacLane spaces. These results will be playing a powerful role in the computation of the same n-type problems and giving us an information about the rational homotopy equivalence.

Original language	English
Pages (from-to)	465-470
Number of pages	6
Journal	Czechoslovak Mathematical Journal
Volume	55
Issue number	2
DOIs	https://doi.org/10.1007/s10587-005-0036-7
State	Published - 2005.06

Keywords

Lie bracket
Rationalization
Steenrod power
Tensor algebra

Quacquarelli Symonds(QS) Subject Topics

Mathematics

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10.1007/s10587-005-0036-7

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title = "Homomorphic images and rationalizations based on the Eilenberg-Maclane spaces",

abstract = "Are there any kinds of self maps on the loop structure whose induced homomorphic images are the Lie brackets in tensor algebra? We will give an answer to this question by defining a self map of Ω∑K(ℤ, 2d), and then by computing efficiently some self maps. We also study the topological rationalization properties of the suspension of the Eilenberg-MacLane spaces. These results will be playing a powerful role in the computation of the same n-type problems and giving us an information about the rational homotopy equivalence.",

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AB - Are there any kinds of self maps on the loop structure whose induced homomorphic images are the Lie brackets in tensor algebra? We will give an answer to this question by defining a self map of Ω∑K(ℤ, 2d), and then by computing efficiently some self maps. We also study the topological rationalization properties of the suspension of the Eilenberg-MacLane spaces. These results will be playing a powerful role in the computation of the same n-type problems and giving us an information about the rational homotopy equivalence.

KW - Lie bracket

KW - Rationalization

KW - Steenrod power

KW - Tensor algebra

UR - https://www.scopus.com/pages/publications/21444437856

U2 - 10.1007/s10587-005-0036-7

DO - 10.1007/s10587-005-0036-7

M3 - Journal article

AN - SCOPUS:21444437856

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VL - 55

SP - 465

EP - 470

JO - Czechoslovak Mathematical Journal

JF - Czechoslovak Mathematical Journal

IS - 2

ER -

Homomorphic images and rationalizations based on the Eilenberg-Maclane spaces

Abstract

Keywords

Quacquarelli Symonds(QS) Subject Topics

Access to Document

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