Presenting higher stacks as simplicial schemes

We show that an n$n$-geometric stack may be regarded as a special kind of simplicial scheme, namely a Duskin n$n$-hypergroupoid in affine schemes, where surjectivity is defined in terms of covering maps, yielding Artin n$n$-stacks, Deligne–Mumford n$n$-stacks and n$n$-schemes as the notion of covering varies. This formulation adapts to all HAG contexts, so in particular works for derived n$n$-stacks (replacing rings with simplicial rings). We exploit this to describe quasi-coherent sheaves and complexes on these stacks, and to draw comparisons with Kontsevich’s dg-schemes. As an application, we show how the cotangent complex controls infinitesimal deformations of higher and derived stacks.