Switching lemma

In group theory, a branch of mathematics, an opposite group is a way to construct a group from another group that allows one to define right action as a special case of left action.

Definition

Let ${\displaystyle G}$ be a group under the operation ${\displaystyle *}$. The opposite group of ${\displaystyle G}$, denoted ${\displaystyle G^{op}}$, has the same underlying set as ${\displaystyle G}$, and its group operation ${\displaystyle {\ast }^{\prime }}$ is defined by ${\displaystyle g_1{\ast }^{\prime }{g}_2=g_2*g_1}$.

If ${\displaystyle G}$ is abelian, then it is equal to its opposite group. Also, every group ${\displaystyle G}$ (not necessarily abelian) is naturally isomorphic to its opposite group: An isomorphism ${\displaystyle \phi :G\to G^{op}}$ is given by ${\displaystyle \phi (x)=x^{-1}}$. More generally, any anti-automorphism ${\displaystyle \psi :G\to G}$ gives rise to a corresponding isomorphism ${\displaystyle {\psi }^{\prime }:G\to G^{op}}$ via ${\displaystyle {\psi }^{\prime }(g)=\psi (g)}$, since

${\displaystyle {\psi }^{\prime }(g*h)=\psi (g*h)=\psi (h)*\psi (g)=\psi (g){\ast }^{\prime }\psi (h)={\psi }^{\prime }(g){\ast }^{\prime }{\psi }^{\prime }(h).}$

Group action

Let ${\displaystyle X}$ be an object in some category, and ${\displaystyle \rho :G\to \mathrm{A}\mathrm{u}\mathrm{t}(X)}$ be a right action. Then ${\displaystyle {\rho }^{op}:G^{op}\to \mathrm{A}\mathrm{u}\mathrm{t}(X)}$ is a left action defined by ${\displaystyle {\rho }^{op}(g)x=\rho (g)x}$, or ${\displaystyle g^{op}x=xg}$.

External links

• http://planetmath.org/encyclopedia/OppositeGroup.html