> Details

Takahashi, Atsushi [Author] ; Iyama, Osamu (Organisation) [Other]; Peña, José Antonio de la (Organisation) [Other]; Krause, Henning (Organisation) [Other]; Wemyss, Michael (Organisation) [Other]

Serre dimension and stability conditions

Reference
management

Bookmarks

Remove from
bookmarks

Share this on Whatsapp

Close

Bookmarks



You can manage bookmarks using lists, please log in to your user account for this.
  • Media type: E-Book; Video
  • Title: Serre dimension and stability conditions
  • Contributor: Takahashi, Atsushi [Author]; Iyama, Osamu (Organisation) [Other]; Peña, José Antonio de la (Organisation) [Other]; Krause, Henning (Organisation) [Other]; Wemyss, Michael (Organisation) [Other]
  • Published: [Erscheinungsort nicht ermittelbar]: Banff International Research Station (BIRS) for Mathematical Innovation and Discovery, 2019
  • Published in: Tilting Theory, Singularity Categories, & Noncommutative Resolutions (19w5161) ; (Jan. 2019)
  • Extent: 1 Online-Ressource (634 MB, 00:54:07:11)
  • Language: English
  • DOI: 10.5446/57878
  • Identifier:
  • Origination:
  • Footnote: Audiovisuelles Material
  • Description: We study the scaling dimension (or the similarity dimension) of the perfect derived category of a smooth compact dg algebra called the Serre dimension. It is expected that the infimum of the Ikeda-Qiu’s global dimsion function on the space of stability conditions also gives another “good” notion of dimension. One of our results is that its infimum is always greater than or equal to the Serre dimension. Motivated by the ADE classification of the 2-dimensional N=2 SCFT with \widehat{c}<1, we also give a characterization of the derived category of Dynkin quivers in terms of the Serre dimension and the global dimension function. This is a joint work in progress with Kohei Kikuta and Genki Ouchi
  • Access State: Open Access
  • Rights information: Attribution - Non Commercial (CC BY-NC)