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Compact matrix quantum group

Compact matrix quantum groups were defined by Woronowicz in [Wor87], originally under the name compact matrix pseudogroups. They generalize compact matrix groups in the field of non-commutative geometry. Compact matrix quantum groups are particular instances of compact quantum groups, where the comultiplication is given by matrix multiplication.

Definition

The term compact matrix quantum group only makes sense with reference to a certain dimension $N\in \N$ . Two definitions appear in the literature, the orginal one by Woronowicz from [Wor87] and an equivalent alternative formulation.

Both define a compact matrix quantum group $G$ as a pair $(A,u)$ of a $C^\ast$ -algebra $A$ and a matrix $u$ with entries in $A$ . In keeping with the general paradigm of non-commutative topology, $A$ is usually referred to as the algebra of continuous functions $C(G)$ on $G$ even if $A$ is non-commutative.

Original version by Woronowicz

A compact $N\!\times\! N$ -matrix quantum group is a pair $(A,u)$ such that

$A$ is a unital $C^\ast$ -algebra,
$u=(u_{i,j})_{i,j=1}^N$ is an $N\!\times\! N$ -matrix of elements $\{u_{i,j}\}_{i,j=1}^N$ of $A$ ,
the $\ast$ -subalgebra $\mathscr{A}$ of $A$ generated by $\{u_{i,j}\}_{i,j=1}^N$ is dense in $A$ ,
there exists a homomorphism $\Phi:A\to A\otimes A$ of $C^\ast$ -algebras from $A$ to the minimal tensor product $A\otimes A$ of $C^\ast$ -algebras of $A$ with itself, with $\Phi(u_{i,j})=\sum_{k=1}^N u_{i,k}\otimes u_{k,j}$ for all $i,j=1,\ldots,N$ and
there exists a linear antimultiplicative mapping $\kappa:\mathscr{A}\to \mathscr{A}$ with $\kappa(\kappa(a^\ast)^\ast)=a$ for all $a\in \mathscr{A}$ and with $\sum_{k=1}^N \kappa(u_{i,k})u_{k,j}=\delta_{i,j}I$ and $\sum_{k=1}^N u_{i,k}\kappa(u_{k,j})=\delta_{i,j}I$ for all $i,j=1,\ldots,N$ , where $I$ is the unit of $A$ .

Alternative version

A compact $N\!\times\! N$ -matrix quantum group is a pair $(A,u)$ such that

$A$ is a unital $C^\ast$ -algebra,
$u=(u_{i,j})_{i,j=1}^N$ is an $N\!\times\! N$ -matrix of elements $\{u_{i,j}\}_{i,j=1}^N$ of $A$ ,
$A$ is generated as a $C^\ast$ -algebra by $\{u_{i,j}\}_{i,j=1}^N$ ,
the unique linear map $\Delta:A\to A\otimes A$ from $A$ to the minimal tensor product $A\otimes A$ of $C^\ast$ -algebras with the property that $\Delta(u_{i,j})=\sum_{k=1}^N u_{i,k}\otimes u_{k,j}$ for all $i,j=1,\ldots,N$ is a homomorphism of $C^\ast$ -algebras
$u$ and $u^t=(u_{j,i})_{i,j=1}^N$ are invertible in the $C^\ast$ -algebra $\C^{N\times N}\otimes A$ .