On morphisms killing weights, weight complexes, and Eilenberg-Maclane (co)homology of spectra

Abstract

We ask whether a morphism g in a triangulated category C endowed with a weight structure "kills weights" (between an integer m and some n m). If g=idM (where M∈ Obj C) and C is Karoubian, then g kills weights m,…,n whenever there exists a weight decomposition of M that "avoids" these weights (in the sense earlier defined by Wildeshaus). We prove the equivalence of several definitions for killing weights. In particular, we describe a family of cohomological functors that "detects" this notion. We also prove that M is without weights m,…, n (i.e., a decomposition of M avoiding these weights exists) if and only if the corresponding condition is fulfilled for its weight complex t(M). These results allow us to get new (stronger) results on the conservativity of the weight complex functor t. We study in detail the case C=SH (endowed with the spherical weight structure whose heart consists of coproducts of sphere spectra); the corresponding weight complex functor is just the one calculating the HZ-homology (whose terms are free abelian groups). In this case g kills weights m,…, n if and only if H(g)=0 for all H represented by elements of SH[m,n] (so, these morphisms form an injective class of morphisms in the sense defined by Christensen; yet this class is not stable with respect to shifts). Moreover, for any spectrum M there exists a "weakly universal decomposition" P M I0 for I0∈ SH[m,n] and P being without weights m,…,n (so, we obtain a torsion pair). We also prove a certain converse to the stable Hurewicz theorem.