Steinberg group (K-theory)

In algebraic K-theory, a field of mathematics, the Steinberg group $operatorname{St}(A)$ of a ring "A", is the universal central extension of the commutator subgroup of the stable general linear group.

It is named after Robert Steinberg, and is connected with lower K-groups, notably $K_2$ and $K_3$ .

Definition

Abstractly, given a ring "A", the Steinberg group $operatorname{St}(A)$ is the universal central extension of the commutator subgroup of the stable general linear group (the commutator subgroup is perfect, hence has a universal central extension).

Concretely, it can also be described by generators and relations.

teinberg relations

Elementary matrices—meaning matrices of the form $e_{pq}(lambda) := mathbf{1} + a_{pq}(lambda)$ , where $mathbf{1}$ is the identity matrix, $a_{pq}(lambda)$ is the matrix with $lambda$ in the $(p,q)$ entry and zeros elsewhere, and $p
eq q$ —satisfy the following relations, called the Steinberg relations:

: $egin{align}e_{ij}(lambda) e_{ij}(mu) &= e_{ij}(lambda+mu) \left [ e_{ij}(lambda),e_{jk}(mu)
ight] &= e_{ik}(lambda mu) && mbox{for } i
eq k\left [ e_{ij}(lambda),e_{kl}(mu)
ight] &= mathbf{1} && mbox{for } i
eq l, j
eq k\end{align}$

The unstable Steinberg group of order "r" over "A", $operatorname{St}_r(A)$ , is defined by the generators $x_{ij}(lambda)$ , $1leq i,jleq r, i
eq j, lambda in A$ , subject to the Steinberg relations. The stable Steinberg group, $operatorname{St}(A)$ , is the direct limit of the system $operatorname{St}_r(A) o operatorname{St}_{r+1}(A)$ . It can also be thought of as the Steinberg group of infinite order.

Mapping $x_{ij}(lambda) mapsto e_{ij}(lambda)$ yields a group homomorphism

: $varphicolonoperatorname{St}(A) ooperatorname{GL}(A).$

As the elementary matrices generate the commutator subgroup, this map is onto the commutator subgroup.

Relation to K-theory

K₁

$K_1(A)$ is the cokernel of the map $varphicolonoperatorname{St}(A) o operatorname{GL}(A)$ , as $K_1$ is the abelianization of $operatorname{GL}(A)$ and $varphi$ is onto the commutator subgroup.

K₂

$K_2(A)$ is the center of the Steinberg group; this was Milnor's definition, and also follows from more general definitions of higher K-groups.

It is also the kernel of the map $varphicolonoperatorname{St}(A) ooperatorname{GL}(A)$ , and indeed there is an exact sequence: $1longrightarrowK_2(A) longrightarrowoperatorname{St}(A) longrightarrowoperatorname{GL}(A) longrightarrowK_1(A)longrightarrow 1.$

Equivalently, it is the Schur multiplier of the group of elementary matrices, and thus is also a homology group: $K_2(A) = H_2(operatorname{E}(A),mathbf{Z})$ .

K₃

$K_3$ of a ring is $H_3$ of the Steinberg group.

This result is proven is the eponymous paper:
* cite journal
title= $K_3$ of a Ring is $H_3$ of the Steinberg Group
author=S. M. Gersten
journal=Proceedings of the American Mathematical Society
vol=37
issue=2
date=Feb., 1973
pages=366–368
doi=10.2307/2039440
id=JSTOR stable URL|0002-9939(197302)37%3A2%3C366%3AOARIOT%3E2.0.CO%3B2-Z
month=Feb
year=1973
volume=37

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