Let $G$ be a finite $p$-group and $mathbb{F}$ a field of characteristic $p$. We filter the cochain complex of a free $G$-space with coefficients in $mathbb{F}$ by powers of the augmentation ideal of $mathbb{F} G$. We show that the cup product induces a multiplicative structure on the arising spectral sequence and compute the $E_1$-page as a bigraded algebra. As an application, we prove that recent counterexamples of Iyengar and Walker to an algebraic version of Carlssons conjecture can not be realized topologically.
تحميل البحث