Steffen Sagave
Published 2006-11-27, updated 2007-10-15Version 3
We construct and examine the universal Toda bracket of a highly structured ring spectrum R. This invariant of R is a cohomology class in the Mac Lane cohomology of the graded ring of homotopy groups of R which carries information about R and the category of R-module spectra. It determines for example all triple Toda brackets of R and the first obstruction to realizing a module over the homotopy groups of R by an R-module spectrum. For periodic ring spectra, we study the corresponding theory of higher universal Toda brackets. The real and complex K-theory spectra serve as our main examples.
Comments: 38 pages; a few typos corrected, to appear in Trans. Amer. Math. Soc
Journal: Trans. Amer. Math. Soc., 360(5):2767-2808, 2008.
Higher homotopy excision and Blakers-Massey theorems for structured ring spectra
Homology of E_n Ring Spectra and Iterated THH
Postnikov extensions of ring spectra
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