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Lie Groups are Groups that are additionally smooth manifolds such that the multiplication and the inverse maps are smooth.
4
votes
Accepted
A lattice in $ \operatorname{SL}_n $ is Ad-irreducible
Per the request to post it as an answer.
Notice that the Ad representation is a polynomial representation into $\operatorname{GL}(\operatorname{Lie}(G))$.
We do know that $\operatorname{Ad}(G)$ acts i …
5
votes
Accepted
Why limit of discrete series representation?
Here is the explanation I know, just for $SL_2$.
The discrete series rep. have realizations in the Hardy spaces $H_n$ which have the norm -
$$\|f\|_ n ^2 = n\int_{D}|f(z)|^2(1-|z|^{2})^{(n-1)}dxdy$$ …
1
vote
Accepted
Lattices in $p$-adic groups
Here's one example that I like.
Consider
$\Gamma = \{g \in SL_d\left[\sqrt{-m} / p\right] \mid g^t \cdot g^\sigma= I \}$, where $\sigma$ is the Galois conjugate. Then this is an arithmetic lattice in …
10
votes
Accepted
References on Lie groups and dynamical systems
The connections between Dynamics and Lie Groups (or Algebraic groups) comes mainly in two flavours:
Smooth dynamics, like others have stated Hamiltonian dyanmics and differential equations.
Applicati …
8
votes
Has dynamics on $G/\Gamma$ ever been used to prove interesting things about $\Gamma$?
There's a nice proof by Margulis showing that arithmetic subgroups are indeed lattices using the famous Dani-Margulis non-divergence theorem.
Actually if you will investigate Ratner's original formula …
0
votes
The Hausdorff codimension of singular matrices vs. the Hausdorff codimension of points with ...
It is evident that the singular vectors are defined as the ``$u_{A}$-part which is $g_{t}$ divergent in the future'', this gives $m\cdot n$ ($=\dim \left(u_{A}\right)$) minus the dimension of the sing …
1
vote
The closure of the orbit of an irrational grid contains the fiber
First of all, $Y$ is not called the “grid space”. It is sometimes called the affine space and can be identified with a quotient of the affine group $\operatorname{ASL}_{n}$, namely the semi-direct pro …