GysinV-functors

Abstract

Let d ≥ 1 be an integer and Kd be a contravariant functor from the category of subgroups of (Z/2Z)d to the category of graded and finite F2-algebras. In this paper, we generalize the conjecture of G. Carlsson, concerning free actions of (Z/2Z)d on finite CW-complexes, by suggesting, that if Kd is a Gysin-(Z/2Z)d-functor (that is to say, the functor Kd satisfies some properties), then we have: (Cd ): \; i ≥ 0ΣdimF2 (Kd(0))i ≥ 2d.\\ We prove this conjecture for 1 ≤ d ≤ 3 and we show that, in certain cases, we get an independent proof of the following result.\\ Theorem. If the group (Z/2Z)d, 1 ≤ d ≤ 3, acts freely and cellularly on a finite CW-complex X, then i ≥ 0ΣdimF2Hi(X;\; F2) ≥ 2d.