Subcategory structures, Grothendieck groups and higher homological algebra
Doctoral thesis
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https://hdl.handle.net/11250/3063393Utgivelsesdato
2023Metadata
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Paper 1: Haugland, Johanne. The Grothendieck Group of an n-exangulated Category. Applied Categorical Structures 2021 ;Volum 29.(3) s. 431-446. Copyright © 2021 Springer.Paper 2: Auslander–Reiten Triangles and Grothendieck Groups of Triangulated Categories. Algebras and Representation Theory 2021 s. Open Access This article is licensed under a Creative Commons Attribution 4.0 CC BY International License
Paper 3: Haugland, Johanne; Jacobsen, Karin M.; Schroll, Sibylle. The role of gentle algebras in higher homological algebra. Forum mathematicum 2022 ;Volum 34.(5) s. 1255-1275. This paper is not included due to copyright restrictions. Available at: https://doi.org/10.1515/forum-2021-0311
Paper 4: Haugland, Johanne; Sandøy, Mads Hustad. Higher Koszul duality and connections with n-hereditary algebras. This paper is submitted for publication and is therefore not included.
Paper 5: Bennett-Tennenhaus, Raphael; Haugland, Johanne; Sandøy Mads Hustad; Shah, Amit. The category of extensions and a characterisation of n-exangulated functors. This paper is submitted for publication and is therefore not included.
Paper 6: August, Jenny; Haugland, Johanne; Jacobsen, Karin M.; Kvamme, Sondre; Palu, Yann; Treffinger, Hipolito. A characterisation of higher torsion classes. This paper is submitted for publication and is therefore not included.