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http://dx.doi.org/10.4134/JKMS.2006.43.5.1047

GOTTLIEB GROUPS AND SUBGROUPS OF THE GROUP OF SELF-HOMOTOPY EQUIVALENCES  

Kim, Jae-Ryong (Department of Mathematics Kookmin University)
Oda, Nobuyuki (Department of Applied Mathematics Fukuoka University)
Pan, Jianzhong (Institute of Mathematics Academy Sciences of Ching)
Woo, Moo-Ha (Department of Mathematics Education Korea University)
Publication Information
Journal of the Korean Mathematical Society / v.43, no.5, 2006 , pp. 1047-1063 More about this Journal
Abstract
Let $\varepsilon_#(X)$ be the subgroups of $\varepsilon(X)$ consisting of homotopy classes of self-homotopy equivalences that fix homotopy groups through the dimension of X and $\varepsilon_*(X) $ be the subgroup of $\varepsilon(X)$ that fix homology groups for all dimension. In this paper, we establish some connections between the homotopy group of X and the subgroup $\varepsilon_#(X)\cap\varepsilon_*(X)\;of\;\varepsilon(X)$. We also give some relations between $\pi_n(W)$, as well as a generalized Gottlieb group $G_n^f(W,X)$, and a subset $M_{#N}^f(X,W)$ of [X, W]. Finally we establish a connection between the coGottlieb group of X and the subgroup of $\varepsilon(X)$ consisting of homotopy classes of self-homotopy equivalences that fix cohomology groups.
Keywords
self-homotopy equivalences; Gottlieb groups; coGottlieb groups;
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