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http://dx.doi.org/10.4134/CKMS.2006.21.1.185

COHOMOLOGY AND TRIVIAL GOTTLIEB GROUPS  

Lee, Kee-Young (Department of Information and Mathematics Korea University)
Publication Information
Communications of the Korean Mathematical Society / v.21, no.1, 2006 , pp. 185-191 More about this Journal
Abstract
This paper observes that the induced homomorphisms on cohomology groups by a cyclic map are trivial. For a CW-complex X, we use the fact to obtain some conditions of X so that the n-th Gottlieb group $G_n(X)$ is trivial for an even positive integer n. As corollaries, for any positive integer m, we obtain $G_{2m}(S^{2m})\;=\;0\;and\;G_2(CP^m)\;=\;0$ which are due to D. H. Gottlieb and G. Lang respectively, where $S^{2m}$ is the 2m- dimensional sphere and $CP^m$ is the complex projective m-space. Moreover, we show that $G_4(HP^m)\;=\;0\;and\;G_8(II)\;=\;0,\;where\;HP^m$ is the quaternionic projective m-space for any positive integer m and II is the Cayley projective space.
Keywords
evaluation subgroup; Gottlieb group; cyclic map;
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