February 20, 2020
11:30AM - 12:30PM
MW 154
Add to Calendar
2020-02-20 12:30:00
2020-02-20 13:30:00
Homotopy Theory Seminar (joint with K-Theory/Motivic Homotopy Theory) -- Martin Frankland
Speaker: Martin Frankland (Regina)
Title: On good morphisms of exact triangles
Seminar URL: https://www.asc.ohio-state.edu/fontes.17/homotopy_seminar/
Abstract: The Adams spectral sequence is available in any triangulated category, a general setup that has found various applications. When studying the triangulated Adams spectral sequence, one runs into the issue of choosing suitably coherent cofibers in an Adams resolution.
Motivated by this, in joint work with Dan Christensen, we develop tools to deal with the limited coherence afforded by the triangulated structure. We use and expand Neeman's work on good morphisms of exact triangles.
MW 154
OSU ASC Drupal 8
ascwebservices@osu.edu
America/New_York
public
Date Range
Add to Calendar
2020-02-20 11:30:00
2020-02-20 12:30:00
Homotopy Theory Seminar (joint with K-Theory/Motivic Homotopy Theory) -- Martin Frankland
Speaker: Martin Frankland (Regina)
Title: On good morphisms of exact triangles
Seminar URL: https://www.asc.ohio-state.edu/fontes.17/homotopy_seminar/
Abstract: The Adams spectral sequence is available in any triangulated category, a general setup that has found various applications. When studying the triangulated Adams spectral sequence, one runs into the issue of choosing suitably coherent cofibers in an Adams resolution.
Motivated by this, in joint work with Dan Christensen, we develop tools to deal with the limited coherence afforded by the triangulated structure. We use and expand Neeman's work on good morphisms of exact triangles.
MW 154
Department of Mathematics
math@osu.edu
America/New_York
public
Speaker: Martin Frankland (Regina)
Title: On good morphisms of exact triangles
Seminar URL: https://www.asc.ohio-state.edu/fontes.17/homotopy_seminar/
Abstract: The Adams spectral sequence is available in any triangulated category, a general setup that has found various applications. When studying the triangulated Adams spectral sequence, one runs into the issue of choosing suitably coherent cofibers in an Adams resolution.
Motivated by this, in joint work with Dan Christensen, we develop tools to deal with the limited coherence afforded by the triangulated structure. We use and expand Neeman's work on good morphisms of exact triangles.