A universal group-theoretic characterisation of p-typical Witt vectors
Abstract
For a prime p and a commutative ring R with unity, let W(R) denote the group of p-typical Witt vectors. The group W(R) is endowed with a Verschiebung operator V: W(R) W(R) and a Teichm\"uller map \ : R→ W(R). One of the properties satisfied by V, \ is that the map R W(R) given by x V xp - p x is an additive map. In this paper we show that for p≠ 2, this property essentially characterises the functor W. Unlike other characterisations, this is a group-theoretic characterisation, in the sense that it does not use the ring structure of W(R). Most constructions of the group of p-typical Witt vectors of non-commutative rings do not have a ring structure, and hence the above characterisation is more suitable for generalisation to the non-commutative setup.
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