A Toda bracket convergence theorem for multiplicative spectral sequences
Algebraic Topology
2024-08-19 v2
Abstract
Moss' theorem, which relates Massey products in the -page of the classical Adams spectral sequence to Toda brackets of homotopy groups, is one of the main tools for calculating Adams differentials. Working in an arbitrary symmetric monoidal stable topological model category, we prove a general version of Moss' theorem which applies to spectral sequences that arise from filtrations compatible with the monoidal structure. The theorem has broad applications, e.g. to the computation of the motivic slice and motivic Adams spectral sequences.
Cite
@article{arxiv.2112.08689,
title = {A Toda bracket convergence theorem for multiplicative spectral sequences},
author = {Eva Belmont and Hana Jia Kong},
journal= {arXiv preprint arXiv:2112.08689},
year = {2024}
}
Comments
Major revision. The previous version did not correctly show how the slice spectral sequence fit the abstract framework. This version weakens the assumptions in the framework. 23 pages