On a spectral sequence for the cohomology of infinite loop spaces

Author(s)

Haugseng, Rune Gjoringbo; Miller, Haynes R

Abstract

We study the mod-2 cohomology spectral sequence arising from delooping the Bousfield-Kan cosimplicial space giving the 2-nilpotent completion of a connective spectrum X. Under good conditions its E₂-term is computable as certain nonabelian derived functors evaluated at H* (X) as a module over the Steenrod algebra, and it converges to the cohomology of Ω ∞ X. We provide general methods for computing the E₂-term, including the construction of a multiplicative spectral sequence of Serre type for cofibration sequences of simplicial commutative algebras. Some simple examples are also considered; in particular, we show that the spectral sequence collapses at E₂ when X is a suspension spectrum.

Date issued

2016-11

URI

http://hdl.handle.net/1721.1/115952

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Algebraic & Geometric Topology

Publisher

Mathematical Sciences Publishers

Citation

Haugseng, Rune, and Haynes Miller. “On a Spectral Sequence for the Cohomology of Infinite Loop Spaces.” Algebraic & Geometric Topology 16, 5 (November 2016): 2911–2947 © 2016 Mathematical Sciences Publishers

Version: Original manuscript

ISSN

1472-2739

1472-2747