Presentable (∞, n)-categories

Abstract

We define for each n ≥ 1 a symmetric monoidal (∞, n+1)-category nPrL whose objects we call presentable (∞,n)-categories, generalizing the usual theory of presentable (∞,1)-categories. We show that each object C in nPrL has an underlying (∞,n)-category n(C) which admits all conical colimits, and that conical colimits of right adjointable diagrams in n(C) can be computed in terms of conical limits after passage to right adjoints.