Abstract
The Adams spectral sequence is available in any triangulated category equipped with a projective or injective class. Higher Toda brackets can also be defined in a triangulated category, as observed by B Shipley based on J Cohen’s approach for spectra. We provide a family of definitions of higher Toda brackets, show that they are equivalent to Shipley’s and show that they are self-dual. Our main result is that the Adams differential in any Adams spectral sequence can be expressed as an –fold Toda bracket and as an order cohomology operation. We also show how the result simplifies under a sparseness assumption, discuss several examples and give an elementary proof of a result of Heller, which implies that the –fold Toda brackets in principle determine the higher Toda brackets.
Citation
J Daniel Christensen. Martin Frankland. "Higher Toda brackets and the Adams spectral sequence in triangulated categories." Algebr. Geom. Topol. 17 (5) 2687 - 2735, 2017. https://doi.org/10.2140/agt.2017.17.2687
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