TY - UNPB
T1 - Homotopy limits in the category of dg-categories in terms of $\mathrm{A}_{\infty}$-comodules
AU - Arkhipov, Sergey
AU - Ørsted, Sebastian
N1 - 31 pages; updated a reference
PY - 2018/12/10
Y1 - 2018/12/10
N2 - In this paper, we apply an explicit construction of a simplicial powering in dg-categories, due to Holstein (2016) and Arkhipov and Poliakova (2018), as well as our own results on homotopy ends (Arkhipov and {\O}rsted 2018), to obtain an explicit model for the homotopy limit of a cosimplicial system of dg-categories. We apply this to obtain a model for homotopy descent in terms of $\mathrm{A}_{\infty}$-comodules, proving a conjecture by Block, Holstein, and Wei (2017) in the process.
AB - In this paper, we apply an explicit construction of a simplicial powering in dg-categories, due to Holstein (2016) and Arkhipov and Poliakova (2018), as well as our own results on homotopy ends (Arkhipov and {\O}rsted 2018), to obtain an explicit model for the homotopy limit of a cosimplicial system of dg-categories. We apply this to obtain a model for homotopy descent in terms of $\mathrm{A}_{\infty}$-comodules, proving a conjecture by Block, Holstein, and Wei (2017) in the process.
KW - math.CT
M3 - Working paper
T3 - arXiv
BT - Homotopy limits in the category of dg-categories in terms of $\mathrm{A}_{\infty}$-comodules
ER -