Regular representation
The (left) regular representation of an algebra $A$ is the linear representation $L$ of $A$ on the vector space $E=A$ defined by the formula $L(a)b=ab$ for all $a,b\in A$. Similarly, the formula $R(a)b=ba$, $a,b\in a$, defines an (anti-) representation of $A$ on the space $E=A$, called the (right) regular representation of $A$. If $A$ is a topological algebra (with continuous multiplication in all the variables), then $L$ and $R$ are continuous representations. If $A$ is an algebra with a unit element or a semi-simple algebra, then its regular representations are faithful (cf. Faithful representation).
A (right) regular representation of a group $G$ is a linear representation $R$ of $G$ on a space $E$ of complex-valued functions on $G$, defined by the formula
$$(R(g)f)(g_1)=f(g_1g),\quad g,g_1\in G,\quad f\in E,$$
provided that $E$ separates the points of $G$ and has the property that the function $g_1\mapsto f(g_1g)$, $g_1\in G$, belongs to $E$ for all $f\in E$, $g\in G$. Similarly, the formula
$$(L(g)f)(g_1)=f(g^{-1}g_1),\quad g,g_1\in G,\quad f\in E,$$
defines a (left) regular representation of $G$ on $E$, where the function $g\mapsto f(g^{-1}g_1)$, $g_1\in G$, is assumed to belong to $E$ for all $g\in G$, $f\in E$. If $G$ is a topological group, then $E$ is often the space of continuous functions on $G$. If $G$ is locally compact, then the (right) regular representation of $G$ is the (right) regular representation of $G$ on the space $L_2(G)$ constructed by means of the right-invariant Haar measure on $G$; the regular representation of a locally compact group is a continuous unitary representation, and the left and right regular representations are unitarily equivalent.
Comments
References
[a1] | C.W. Curtis, I. Reiner, "Methods of representation theory" , 1–2 , Wiley (Interscience) (1981–1987) |
Regular representation. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Regular_representation&oldid=32623