Witt vectors and δ-Cartier rings

Abstract

We give a universal property of the construction of the ring of p-typical Witt vectors of a commutative ring, endowed with Witt vectors Frobenius and Verschiebung, and generalize this construction to the derived setting. We define an ∞-category of p-typical derived δ-Cartier rings and show that the derived ring of p-typical Witt vectors of a derived ring is naturally an object in this ∞-category. Moreover, we show that for any prime p, the formation of the derived ring of p-typical Witt vectors gives an equivalence between the ∞-category of all derived rings and the full subcategory of all derived p-typical δ-Cartier rings consisting of V-complete objects.