La filtration de Krull de la categorie U et la cohomologie des espaces

Abstract

Paper written in French -- English abstract: This paper proves a particular case of a conjecture of N. Kuhn. This conjecture is as follows. Consider the Gabriel-Krull filtration of the category U of unstable modules. Let Un, n>=0, be the n-th step of this filtration. The category U is the smallest thick sub-category that contains all sub-categories Un and is stable under colimit [L. Schwartz, Unstable modules over the Steenrod algebra and Sullivan's fixed point set conjecture, Chicago Lectures in Mathematics Series (1994)]. The category U0 is the one of locally finite modules, i.e. the modules that are direct limit of finite modules. The conjecture is as follows, let X be a space then : * either H*X is locally finite, * or H*X does not belong to Un, for all n. As an example the cohomology of a finite space, or of the loop space of a finite space are always locally finite. On the other side the cohomology of the classifying space of a finite group whose order is divisible by 2 does belong to any sub-category Un. One proves this conjecture, modulo the additional hypothesis that all quotients of the nilpotent filtration are finitely generated. This condition is used when applying N. Kuhn's reduction of the problem. It is necessary to do it to be allowed to apply Lannes' theorem on the cohomology of mapping spaces.[N. Kuhn, On topologically realizing modules over the Steenrod algebra, Ann. of Math. 141 (1995) 321-347].

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