Math4302 Modern Algebra (Lecture 21)

Let $D_4$ acting on $X=\{1,2,3,4\}$. Let $D_4=\{e,\rho,\rho^2,\rho^3,\mu,\mu\rho,\mu\rho^2,\mu\rho^3\}$.

define $\phi\in D_4$, $i\in X$, $\phi\cdot i=\phi(i)$

The orbits are:

orbit of 1: $D_4\cdot 1=\{1,2,3,4\}$. This is equal to orbit of 2,3,4.

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Let $G=S_3$ acting on $X=S_3$ via conjugation, let $\sigma\in X$ and $\phi\in G$, we define $\phi\cdot\sigma\coloneqq \phi\sigma\phi^{-1}$.

$S_3=\{e,(1,2,3),(1,3,2),(1,2),(1,3),(2,3)\}$.

The orbits are:

orbit of $e$: $G e=\{e\}$. since $geg^{-1}=e$ for all $g\in S_3$.

orbit of $(1,2,3)$:

• $e(1,2,3)e^{-1}=(1,2,3)$
• $(1,3,2)(1,2,3)(1,3,2)^{-1}=(1,2,3)$
• $(1,2,3)(1,2,3)(1,2,3)^{-1}=(1,2,3)$
• $(1,2)(1,2,3)(1,2)^{-1}=(2,3)(1,2)=(1,3,2)$
• $(1,3)(1,2,3)(1,3)^{-1}=(1,2)(1,3)=(1,3,2)$
• $(2,3)(1,2,3)(2,3)^{-1}=(1,3)(2,3)=(1,3,2)$

So the orbit of $(1,2,3)$ is equal to orbit of $(1,3,2)$. $=\{(1,2,3),(2,3,1)\}$.

orbit of $(1,2)$:

• $(1,2,3)(1,2)(1,2,3)^{-1}=(1,3)(1,3,2)=(2,3)$
• $(1,3,2)(1,2)(1,3,2)^{-1}=(2,3)(1,2,3)=(1,3)$

Therefore orbit of $(1,2)$ is equal to orbit of $(2,3)$, $(1,3)$. $=\{(1,2),(2,3),(1,3)\}$

The orbits may not have the same size.

Let $D_4$ acting on $X=\{1,2,3,4\}$, find $G_1$, $G_2$, $G_3$, $G_4$.

$G_1=G_3=\{e,\mu\}$, $G_2=G_4=\{e,\mu\rho^2\}$.

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Let $S_3$ acting on $X=S_3$. Find $G_{e}$, $G_{(1,2,3)}$, $G_{(1,2)}$.

$G_{e}=S_3$, $G_{(1,2,3)}=G_{(1,3,2)}=\{e,(1,2,3),(1,3,2)\}$, $G_{(1,2)}=\{e,(1,2)\}$, ($G_{(1,3)}=\{e,(1,3)\}$, $G_{(2,3)}=\{e,(2,3)\}$)

The larger the orbit, the smaller the stabilizer.

Define $\alpha$ be the function that maps the set of left cosets of $G_x$ to orbit of $x$. $gG_X\mapsto g\cdot x$.

This function is well defined. And $\alpha$ is a bijection.

Continue next lecture.