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Un 3-polyGEM de cohomologie modulo 2 nilpotente | Jiang Dong Hua
; | Date: |
17 Jun 2003 | Subject: | Algebraic Topology MSC-class: 55N99; 55P20 | math.AT | Abstract: | In 1983, C. McGibbon and J. Neisendorfer have given a proof for one conjecture in J.-P. Serre’s famous paper (1953). In 1985, another proof was given by J. Lannes and L. Schwartz. Since then, one considers a more general conjecture: if the reduced mod 2 cohomology of any 1-connected polyGEM is of finite type and is not trivial, then it contains at least one element of infinite height, i.e., non nilpotent. This conjecture has been verified in several special situations, more precisely, by Y. Felix, S. Halperin, J.-M. Lemaire and J.-C. Thomas in 1987, by J. Lannes and L. Schwartz in 1988, and by J. Grodal in 1996. In this note, we construct an example, for which this conjecture fails. | Source: | arXiv, math.AT/0306253 | Services: | Forum | Review | PDF | Favorites |
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