A universal construction of p-typical Witt vectors of associative rings

Abstract

For a prime p and an associative ring R with unity, there are various constructions of p-typical Witt vectors of R, all of which specialize to the classical p-typical Witt vectors when R is commutative. These constructions are endowed with a Verschiebung operator V and a Teichm\"uller map · , and they satisfy the property that the map x V xp - p x is additive. In this paper, we adapt the group-theoretic universal characterization of classical p-typical Witt vectors proposed in arXiv:2405.12680 to the non-commutative setting. Our main result is that this approach yields a construction of Witt vectors for associative rings, denoted E, which specializes correctly to the classical Witt functor in the commutative case. The construction of E is inspired by the Witt functor of Cuntz--Deninger, and we show that E is a universal pre-Witt functor, subject to an explicit conjecture concerning non-commutative polynomials. We further introduce the notion of a Witt functor and construct a universal Witt functor E, which is closely related to Hesselholt's Witt functor WH. We suspect that WH is, in fact, the universal Morita-invariant Witt functor.