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Questions tagged [lie-groups]

A Lie group is a group (in the sense of abstract algebra) that is also a differentiable manifold, such that the group operations (addition and inversion) are smooth, and so we can study them with differential calculus. They are a special type of topological group.

Consider using with the (group-theory) tag.

Lie groups are groups that are also differentiable manifolds that represent the best developed theory of continuous symmetry of mathematical objects.

Examples of lie groups are:

1) The Euclidean space $\mathbb{R}^n$ under addition is a lie group.

2) The special orthogonal group of real orthogonal matrices with determinant $1$ (note that $n=3$ is the rotation group in $\mathbb{R}^3$).

3) The spin group, which is the double cover of the special orthogonal group such that $\exists$ a sequence of lie groups:

\begin{equation*} 1\to Z_2\to~\text{Spin}(n)\to SO(n)\to 1. \end{equation*}

Note that it has dimension $\frac{n(n-1)}{2}.$

7686 questions
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Generator inifinitesimal SU(3)

I have to compute generator $SU(3)$ and I got 6 generator with diagonal = 0. I check in wiki, it says $SU(3)$ have 8. From where 2 generators else?
julius susanto
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Why closed subgroup of a lie group $H$ equal to the $G$?

I was reading a book where for $G$ a connected lie group, and $H$ a subgroup of $G$. It proved that $H$ be closed sub lie group of $G$, and then concluded that $H=G$. Is it correct? If so, why?(Is it because the manifold structure of $G$?)
ShoutOutAndCalculate
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Exponential of an upper triangular matrix filled with 1.

I need to find the exponential of the following matrix: $$ A= \begin{pmatrix} 1 & 1 & 1 & \cdots & 1 \\ 0 & 1 & 1 & \cdots &1 \\ 0 & 0 & 1 & \cdots &1 \\ \vdots & \vdots& \vdots& \ddots & \vdots\\ 0&0&0 & \cdots&1 …
Lucía Osorio
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Are there non-embedded tori in Lie groups?

Lie subgroups are certainly not always embedded (there is the example of the $\mathbb{R} \to S^1 \times S^1$ given by a line of irrational slope). Can you have a torus that is a subgroup of a Lie group, but not embedded? To me it seems like the…
pizzaroll
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Is SL(2,C) unimodular

My question is in the title, do you know if SL(2,C) is an unimodular group or not and how to prove it ? Thank you.
théo jamin
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Flow generated by a matrix Lie group

I found this question in a book by Baez and Muniain on Gauge theory and knots. It was given in one of the exercises. $G$ is a matrix Lie group and $v$ is a left invariant vector field defined on $G$. $v_{1}$ is the value of the vector field at the…
Rohit Roy
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What is the Lie group defined by 2 x 2 matricies?

It says on Wikipedia: "to any finite-dimensional Lie algebra over real or complex numbers, there is a corresponding connected Lie group unique up to covering." We can turn $2 \times 2$ matricies over the reals into a Lie algebra by defining $[a, b] …
Stephen Wynn
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Torsion subgroup of SO3 can not be dense

I've been trying to attack this problem in many ways, but Couldn't figure out the right answer . The question is, That a finitely generated subgroup of SO3 when all the elements are of finite order, can not be dense . This is a preceding question to…
Raz
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factorization of the group SU(3)

My question is if there is a way to construct a factorization of SU(3) into products of the 3 subgroups copies of SU(2) through the root system?
user30656
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SL_N(R) quadratic invariant?

For a problem I'm working on, it would be helpful to be able to calculate $E[M M^T]$, where the expectation value is taken over $SL_N(\mathbb{R})$. Is this well defined? I suspect that if it is, the result is a multiple of $I_N$ (sign-flips should…
Craig
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Are palindromic triples of roots of any interest in algebraic group E6?

Consider the 72 roots of the algebraic group E6 in their most symmetric coordinatization (in 9-space), as given in the section "Roots of E6" here: https://en.wikipedia.org/wiki/E6_(mathematics) From these roots, we can clearly form ordered…
David Halitsky
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Dimension of $SU(N)$

I am trying to find that the real dimension of $SU(N)$ is $N^2-1$ but I make a mistake and I don't know where. I would like to prove it directly on the group (I don't want to use the algebra). What I did : $$SU(N)=\{ A \in \mathcal{M}_N(\mathbb{C})…
StarBucK
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On conditions to prove that a Lie group is compact.

Can anyone help me with this problem: If G is a Lie group and H a compact subgoup of G, such that G/H is also compact, how to prove that G is compact? I have tried to push forward an open covering of G to G/H be the quotient map, apply compactness…
kvicente
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Every connected semisimple subgroup of $GL(n,\mathbb{R})$ is in $SL(n,\mathbb{R})$?

Let $G$ be a connected, semisimple subgroup of $GL(n,\mathbb{R})$. Here, semisimple means that $G$ has no normal, connected abelian subgroup other than the trivial group. In Mostows book Strong rigidity of locally symmetric spaces, on p. 11, he…
abenthy
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the map exp for compact real lie groups

Something I'm reading says that for a compact connected complex Lie group $G$, the kernel of $\exp:T_e(G) \to G$ is a lattice $\Lambda$ in $T_e(G)$, and $\exp$ is surjective, so $G \simeq T_e(G)/\Lambda$. What is the story for real compact connected…
usr0192
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