Let \(G\) be a topological group and \(g\in G\). The map \(L_g\colon G\to G\) with \(L_g(g')=gg'\) is called left translation by \(g\). Similarly, right translation by \(g\) is denoted by \(R_g(g')=g' g\).
Let \(G\) be a topological group and \(g\in G\). The map \(L_g\colon G\to G\) with \(L_g(g')=gg'\) is called left translation by \(g\). Similarly, right translation by \(g\) is denoted by \(R_g(g')=g' g\).