Higher differentials in Adams spectral sequence

Surojit Ghosh (University of Haifa)

19-Oct-2020, 10:40-11:30 (3 years ago)

Abstract: The $E_2$-term of the Adams spectral sequence may be identified with certain derived functors, and this also holds for other Bousfield-Kan types spectral sequence.

In this talk, I'll explain how the higher terms of such spectral sequences are determined by truncations of functors, defined in terms of certain (spectrally) enriched functor called mapping algebras.

This is joint work with David Blanc.

algebraic topologycategory theorygroup theoryK-theory and homology

Audience: researchers in the topic

( video )


Cihan Okay

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Organizer: Cihan Okay*
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