Spahn Witt polynomial

Definition

Let $p$ be a prime number, let $n\in \mathbb{N}$ . Then the $n$ -th $p$ -adic Witt polynomial is defined by

w_n(X):=\sum_{d|n}d X_d^{n/d}

This formula comes out of consideration of addition of Teichmüller representatives?, a multiplicative section of the natural projection $A\to k$ of a discrete valuation ring to its residue field?. This section is unique if $k$ is perfect.

Witt polynomials are one way to define Witt vectors.

(Hazewinkel)

References

Hazewinkel, Witt vectors.