Mathematics Stack Exchange
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Questions tagged [group-actions]

Use with the (group-theory) tag. Groups describe the symmetries of an object through their actions on the object. For example, dihedral groups of order $2n$ act on regular $n$-gons, $S_n$ acts on the numbers ${1, 2, \ldots, n}$ and the Rubik's cube group acts on Rubik's cube.

Groups describe the symmetries of an object through their actions on the object. For example, dihedral groups of order $2n$ act on regular $n$-gons, $S_n$ acts on the numbers $\{1, 2, \ldots, n\}$ and the Rubik's cube group acts on Rubik's cube.

When describing a group action, it should be clear whether the action is a left action or a right action. A right action is a function,

$\cdot : X\times G\rightarrow X$

such that $x\cdot 1=x$ for all $x\in X$ and such that $(x\cdot g)\cdot h=x\cdot (gh)$. These conditions mean the action of the group makes sense; that the action is compatible with the group.

A left action is defined analogously.

If $G$ acts on $X$ then there exists a homomorphism of groups $G\rightarrow \operatorname{Aut}(X)$. This is of interest when $X$ is a group too, and allows us to construct semidirect products of groups.

For more details, see Wikipedia.

3093 questions
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What is difference between free and faithful group action?

I searched Wikipedia for definitions of free and faithful actions. As I understand them, the two concepts are the same thing! If they are one concept, what is the point of introducing both or even of naming them in distinct ways?
mja
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Homsets of group actions related to fixed points

MacLane and Moerdijk's Sheaves in Geometry and Logic has a section on Continuous Group Actions (Sec. III.9). On page 152, there is an isomorphism displayed: $$Hom_G(G/U, X) \cong X^U$$ In their set-up, $G$ is a topological group, $U$ is an open…
Uday Reddy
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For a finite group $G$ consider the left action of conjugation of $G$ on itself $·:G×G→G$ given by $g·x=gxg^{-1}$.

For a finite group $G$ consider the left action of conjugation of $G$ on itself $·:G×G→G$ given by $g·x=gxg^{-1}$. Prove that if $H$ is normal in $G$ then $H$ is the disjoint union of orbits of this action. (Note that the orbits in this case are…
MochiS
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Group action question

Take $G=\mathbb{Z_6}$ and $X=\{a,b,c,d,e\}$. This is a group action that my teacher did during class and I'm not understanding this example, please help me understand!! Define the action as follows: $1 \cdot a =b$ $1 \cdot b=c$ $1 \cdot c=a$ $1…
Skypanties
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$S_n$ right-action on $V^{\otimes n}$

$S_n$ acts on $V^{\otimes n}$ ($V$: a vector space) from the right as $$x_1\otimes ...\otimes x_n.\sigma=x_{\sigma(1)}\otimes ...\otimes x_{\sigma(n)},$$ but I don't see why as I get $$x_1\otimes ...\otimes…
user500228
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How to show that $SL_2(\Bbb R)/SO_2(\Bbb R) \cong \Bbb H$?

I've already shown that $SL_2(\Bbb R)$ acts on $\Bbb H$ on the left : $$SL_2(\Bbb R) \times \Bbb H \rightarrow \Bbb H$$ $$\gamma*z \mapsto \frac{az + b}{cz + d}$$ where $\gamma = \begin{pmatrix} a & b \\ c & d \end{pmatrix} \in SL_2(\Bbb R)$ and…
Desura
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Group orbit computations

Can someone please verify these? Compute the orbit of a vertex of the square under the tautological action of $D_4$. Compute the orbit of a point $x \in G$ under the action of $G$ on itself by multiplication. Compute the orbit of a point $z \in…
Jessie
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the largest prime number $p$ dividing $ \left|G\right| $ is also divide $ \left|X\right| $.

Let $ G $ be a finite simple group which acts on finite set $ X $ non-trivially. The goal is that the largest prime number $p$ dividing $ \left|G\right| $ is also divide $ \left|X\right| $. I know $G$ is embedded in $S_{X}$. But, I can't get any…
jawlang
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Transitive action of $\text{SL}(n,\mathbb Z)$

$\text{SL}(n,\mathbb Z)$ acts transitively on the set of ordered pairs of distinct 1-dimensional subspaces of $\mathbb Q^n$. Could you mention an article or a book where such a proof can be found? Would you sketch such a proof here? Thanks in…
user206447
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verifying the sizes of a group acting on a set

Is $S_4$ a group of size four and $X={1,2,3,4}$ a set of size four? Need clarification on this. just wan to be clear on the sizes of the group and the set.
Lynnie
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If two groups act on a set in the same way then are the two groups related?

Let $G_1, G_2$ be two groups that act on a set $S$ on the left, such that for all $g \in G_1$ there's $g' \in G_2$ such that $g\cdot s = g'\cdot s$ for all $s \in S$. Define $h : G_1 \to G_2$, $h(g) = g'$ as defined above. Then $h(ab) = (ab)'$. …
Daniel Donnelly
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Clarifying the action of $\mathrm{PSL}(2,\mathbb{R})$ on $\mathbf{H}^2$.

I’m working my way up towards understanding the proof of the fact that the geodesic flow on $\mathbf{H}^2$ (the hyperbolic space) is ergodic, and, in doing so, I’ve come across the group $\mathrm{PSL}(2,\mathbb{R}) =…
joshuaheckroodt
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What is this property of a group action called?

Suppose we have a group $G$ acting on a topological space $X$, and there exists a $contractible$ open set $U$ in $X$ such that the orbit of $U$ is $X$.
ZxJx
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Understanding Fuchsian groups and discontinuous actions

this is a pretty basic question but I am struggling to make sense of the definitions. In Iwaniec's book on automorphic forms, page 29 he begins Let $X$ be a topological space (Hausdorff) and $\Gamma$ a group of homeomorphisms of $X$ acting on $X$…
irh
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What is meant by $\text{coordinatewise complex conjugation}$ in group action?

$\text{Group Action}:$ What is meant by $\text{coordinatewise complex conjugation}$ in group action ? Do there there exists any concept of $\text{conjugation}$ in Group action ? I am week in Group action theory. This context is from my previous…
MAS
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