A DG category can be considered as an infinity category, say by taking Dold-Kan of the coconnective part of Hom spaces, thus obtaining a simplicial category.
My question is, are the following equivalent: this underlying infinity category having finite colimits and limits, and our DG category being pre-triangulated.
Thank you, sasha
This paper worked out in gory detail the equivalence between pre-triangulated dg-categories and certain stable categories.
http://arxiv.org/abs/1308.2587
The definition of stable category can be found in Lurie's higher algebra: Defn 1.1.1.9.
At least one direction of the question is answered by the paper
See section 4.2, where he proves that for a pre-triangulated dg-category, its dg-nerve is a stable $\infty$-category. Here dg-nerve means either the construction you described (applying Dold-Kan and then the simplicial nerve) or a construction from Lurie's Higher algebra that associates directly an $\infty$-category to a dg-category; the above paper shows that both constructions are equivalent. The author does not address explicitly the converse statement, that if the dg-nerve is stable then the dg-category is pre-triangulated, but I would expect it to be true as well.
