Witt vector

An element of an algebraic construct, first proposed by E. Witt [1] in 1936 in the context of the description of unramified extensions of $p$-adic number fields. Witt vectors were subsequently utilized in the study of algebraic varieties over a field of positive characteristic [3], in the theory of commutative algebraic groups [4], [5], and in the theory of formal groups [6]. Let $A$ be an associative, commutative ring with unit element. Witt vectors with components in $A$ are infinite sequences $a = (a_0,a_1,\ldots)$, $a_i \in A$, which are added and multiplied in accordance with the following rules: $$ (a_0,a_1,\ldots) \oplus (b_0,b_1,\ldots) = (S_0(a_0;b_0), S_1(a_0,a_1;b_0,b_1), \ldots) $$ $$ (a_0,a_1,\ldots) \otimes (b_0,b_1,\ldots) = (M_0(a_0;b_0), M_1(a_0,a_1;b_0,b_1), \ldots) $$

where $S_n,M_n$ are polynomials in the variables $X_0,\ldots,X_n$, $Y_0,\ldots,Y_n$ with integer coefficients, uniquely defined by the conditions $$ \Phi_n(S_0,\ldots,S_n) = \Phi_n(X_0,\ldots,X_n) + \Phi_n(Y_0,\ldots,Y_n) $$ $$ \Phi_n(M_0,\ldots,M_n) = \Phi_n(X_0,\ldots,X_n) \cdot \Phi_n(Y_0,\ldots,Y_n) $$ where $$ \Phi_n(Z_0,\ldots,Z_n) = Z_0^{p^n} + p Z_1^{p^{n-1}} + \cdots + p^n Z^n $$ are polynomials, $n \in \mathbf{N}$ and $p$ is a prime number. In particular, $$ S_0 = X_0 + Y_0 \ ;\ \ \ S_1 = X_1 + Y_1 - \sum_{i=1}^{p-1} \frac{1}{p} \binom{p}{i} X_0^i Y_0^{p-i} $$ $$ M_0 = X_0 \cdot Y_0 \ ;\ \ \ M_1 = X_0^p Y_1 + X_1 Y_0^p + p X_1 Y_1 \ . $$

The Witt vectors with the operations introduced above form a ring, called the ring of Witt vectors and denoted by $W(A)$. For any natural number $n$ there also exists a definition of the ring $W_n(A)$ of truncated Witt vectors of length $n$. The elements of this ring are finite tuples $a = (a_0,\ldots,a_{n-1})$, $a_i \in A$ with the addition and multiplication operations described above. The canonical mappings $$ R : W_{n+1}(A) \rightarrow W_n(A) $$ $$ R : (a_0,\ldots,a_n) \mapsto (a_0,\ldots,a_{n-1}) $$ $$ T : W_n(A) \rightarrow W_{n+1}(A) $$ $$ T : (a_0,\ldots,a_{n-1}) \mapsto (0,a_0,\ldots,a_{n-1}) $$ are homomorphisms. The rule $A \to W(A)$ (or $A \to W_n(A)$) defines a covariant functor from the category of commutative rings with unit element into the category of rings. This functor may be represented by the ring of polynomials $\mathbf{Z}[X_0,X_1,\ldots]$ (or $\mathbf{Z}[X_0,X_1,\ldots,X_n]$) on which the structure of a ring object has been defined. The spectrum $\mathrm{Spec}\mathbf{Z}[X_0,X_1,\ldots]$ (or $\mathrm{Spec}\mathbf{Z}[X_0,X_1,\ldots,X_n]$) is known as a Witt scheme (or a truncated Witt scheme) and is a ring scheme [3].

Each element $a \in A$ defines a Witt vector $$ a^T = (a,0,0,\ldots) \in W(A) $$ called the Teichmüller representative of the element $a$. If $A = k$ is a perfect field of characteristic $p>0$, then $W(k)$ is a complete discrete valuation ring of zero characteristic with field of residues $k$ and maximal ideal $pW(k)$. Each element $w \in W(k)$ can be uniquely represented as $$ w = w_0^T + pw_1^T + p^2 w_2^T + \cdots $$ where $w_i \in k$. Conversely, each such ring $A$ with field of residues $k = A/(p)$ is canonically isomorphic to the ring $W(k)$. The Teichmüller representation makes it possible to construct a canonical multiplicative homomorphism $k \to W(k)$, splitting the mapping $W(k) \to W(k)/(p)$.

If $k = \mathbf{F}_p$ is the prime field of $p$ elements, $W(k)$ is the ring of integral $p$-adic numbers $\mathbf{Z}_p$.

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Comments

There is a generalization of the construction above which works for all primes $p$ simultaneously, [a3]: a functor $W : \mathsf{Ring} \to \mathsf{Ring}$ called the big Witt vector. Here, $\mathsf{Ring}$ is the category of commutative, associative rings with unit element. The functor described above, of Witt vectors of infinite length associated to the prime $p$, is a quotient of $W$ which can be conveniently denoted by $W_{p^\infty}$.

For each $n \in \{1,2,\ldots\}$, let $w_n(X)$ be the polynomial $$ w_n(X) = \sum_{d | n} d X^{n/d} \ . $$

Then there is the following characterization theorem for the Witt vectors. There is a unique functor $W : \mathsf{Ring} \to \mathsf{Ring}$satisfying the following properties: 1) as a functor $W : \mathsf{Ring} \to \mathsf{Set}$, $W(A) = \{(a_1,a_2,\ldots) : a_i \in A\}$ and $W(\phi)((a_1,a_2,\ldots)) = (\phi(a_1),\phi(a_2),\ldots)$ for any ring homomorphism $\phi : A \to B$; 2) $w_{n,A} : W(A) \to A$, $w_{n,A} : (a_1,a_2,\ldots) \mapsto w_n(a_1,a_2,\ldots)$ is a functorial homomorphism of rings for every $n$ and $A$.

The functor $W$ admits functorial ring endomorphisms $\mathbf{f}_n : W \to W$, for every $n \in \{1,2,\ldots\}$, that are uniquely characterized by $wn \mathbf{f}_m = w_{nm}$ for all $m,n \in \{1,2,\ldots\}$. Finally, there is a functorial homomorphism $\Delta : W({-}) \to W(W({-}))$ that is uniquely characterized by the property $w_{n,W(A)} \Delta_A = \mathbf{f}_{n,A}$ for all $n$,$A$.

To construct $W(A)$, define polynomials $\Sigma_n$; $\Pi_n$; $r_n$ for $n \in \{1,2,\ldots\}$ by the requirements $$ w_n(\Sigma_1,\ldots,\Sigma_n) = w_n(X) + w_n(Y) \ ; $$ $$ w_n(\Pi_1,\ldots,\Pi_n) = w_n(X) \cdot w_n(Y) \ ; $$ $$ w_n(r1,\ldots,r_n) = - w_n(X) \ . $$

The $\Sigma_n$ and $\Pi_n$ are polynomials in $X_1,\ldots,X_n$; $Y_1,\ldots,Y_n$ and the $r_n$ are polynomials in the $X_1,\ldots,X_n$ and they all have integer coefficients. Now $W(A)$ is defined as the set $W(A) = \{ a = (a_1,a_2,\ldots) : a_i \in A \}$ with operations : $$ (a_1,a_2,\ldots) + (b_1,b_2,\ldots) = (\Sigma_1(a,b), \Sigma_2(a,b), \ldots) \ ; $$ $$ (a_1,a_2,\ldots) \cdot (b_1,b_2,\ldots) = (\Pi_1(a,b), \Pi_2(a,b), \ldots) \ ; $$ $$ - (a_1,a_2,\ldots) = (r_1(a), r_2(a), \ldots) \ . $$

The zero of $W(A)$ is $(0,0,0,\ldots)$ and the unit element is $(1,0,0,\ldots)$. The Frobenius endomorphisms $\mathbf{f}_n$ and the Artin–Hasse exponential $\Delta$ are constructed by means of similar considerations, i.e. they are also given by certain universal polynomials. In addition there are the Verschiebung morphisms $\mathbf{V}_n : W({-}) \to W({-})$, which are characterized by $$ w_n \mathbf{V}_m = \begin{cases} 0 & \text{if}\, n \not\mid m \\ n w_{m/n} & \text{if}\, n | m \end{cases} \ . $$

The $\mathbf{V}_n$ are group endomorphisms of $W(A)$ but not ring endomorphisms.

The ideals define a topology on making a separated complete topological ring.

For each , let be the Abelian group under multiplication of power series;

defines a functional isomorphism of Abelian groups, and using the isomorphism there is a commutative ring structure on . Using the Artin–Hasse exponential defines a functorial homomorphism of rings

making a functorial special -ring. The Artin–Hasse exponential defines a cotriple structure on and the co-algebras for this co-triple are precisely the special -rings (cf. also Category and Triple).

On the Frobenius and Verschiebung endomorphisms satisfy

and are completely determined by this (plus functoriality and additivity in the case of ).

For each supernatural number , , one defines , where is the -adic valuation of , i.e. the number of prime factors in . Let

Then is an ideal in and for each supernatural a corresponding ring of Witt vectors is defined by

In particular, one thus finds , the ring of infinite-length Witt vectors for the prime , discussed in the main article above, as a quotient of the ring of big Witt vectors .

The Artin–Hasse exponential is compatible in a certain sense with the formation of these quotients, and using also the isomorphism one thus finds a mapping

where denotes the -adic integers and the field of elements, which can be identified with the classical morphism defined by Artin and Hasse [a1], [a2], [a3].

As an Abelian group is isomorphic to the group of curves of curves in the one-dimensional multiplicative formal group . In this way there is a Witt-vector-like Abelian-group-valued functor associated to every one-dimensional formal group. For special cases, such as the Lubin–Tate formal groups, this gives rise to ring-valued functors called ramified Witt vectors, [a3], [a4].

Let be the sequence of polynomials with coefficients in defined by

The Cartier ring is the ring of all formal expressions

(*)

with the calculation rules

Commutative formal groups over are classified by certain modules over . In case is a -algebra, a simpler ring can be used for this purpose. It consists of all expressions (*) where now the only run over the powers of the prime . The calculation rules are the analogous ones. In case is a perfect field of characteristic and denotes the Frobenius endomorphism of (which in this case is given by ), then can be described as the ring of all expressions

in two symbols and and with coefficients in , with the extra condition and the calculation rules

This ring, and also its subring of all expressions

is known as the Dieudonné ring and certain modules (called Dieudonné modules) over it classify unipotent commutative affine group schemes over , cf. [a5].

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