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Linear representations of algebras and groups, Lie theory, associative algebras, multilinear algebra.
6
votes
Have people successfully worked with the full ring of differential operators in characterist...
Certainly the fact that the ring of differential operators is non-Noetherian is an inconvenience but it is not clear if it is more than that. For instance one can define the notion of holonomic module …
17
votes
Accepted
Uniqueness of splitting field for linear representations of finite groups
You need two conditions for a field to be a splitting field for a specific irreducible representation (in characteristic zero to begin with): It must contain the character values of the representation …
3
votes
Accepted
The Jacobson radical of an infinite dimensional algebra
As there seem to be some differing opinions in the comments as to whether all
irreducible representations are finite-dimensional let me give the argument I
had in mind. A module over the path algebra …
3
votes
Accepted
Is there an analog of Clifford Theorem in the setting of Lie algebras?
The positive results seem at most to be tied to finite dimensional representations in positive characteristic:
Let $\frak H$ be the Heisenberg algebra with basis $x,y,$ where $c$ is central and $[y,x …
6
votes
Accepted
If Spec(A) has a G-fixed point and a dense G-orbit, is Spec(A) a cone?
If you by "cone" mean exactly that $A$ should be isomorpic to
$\mathrm{gr}_{\mathfrak m}A$ it seems that the following is counterexample: Let
$G=\mathbb G_m$, $A=k[x,y,z]/(x^2+y^3+z^5)$ with $tx=t^{15 …
34
votes
Accepted
Which groups have only real and quaternionic irreducible representations?
An irreducible representation is real or quaternionic precisely when its
character is real-valued. By the Peter-Weyl theorem all characters are
real-valued precisely when every element in the group is …
1
vote
A family of hypersurfaces with many points
This is very far from a solution but just some ideas that could be possibly be
used as a start.
First a simple observation on an Artin-Schreier type extension $X\rightarrow Y$,
where $X:=\mathrm{Spec …
2
votes
Non-vanishing cohomology of line bundles on projective varieties in prime characteristic?
I am not sure to which extent your questions are really related to positive
characteristic.
The obvious difference between positive characteristic and characteristic zero
related to the question is o …
7
votes
Accepted
Determinant and symmetric power
We have that $\det T_k$ is a fixed (depending on $n=\dim V$ and $k$ only) power of
$\det T$. To see this, as well as getting the power, one can for instance note
that $\mathrm{SL}(V)$ is the commutato …
19
votes
Accepted
Hilbert 90 for algebras
It's actually easier to go the other way around. Finite dimensional modules over
an algebra $A$ fulfils the Krull-Remak-Schmidt theorem of being isomorphic to a
direct sum of indecomposable modules wi …
5
votes
Tensor products of Weyl modules in positive characteristic
Yes, it is true in general.
I found it as Thm 3.1.2 of Brion, Michel(F-GREN-IF); Kumar, Shrawan(1-NC)
Frobenius splitting methods in geometry and representation theory.
Progress in Mathematics, 231. B …
2
votes
Accepted
What is an obviously coordinate-independent description of the Chevellay-Eilenberg complex f...
I think that the relation is that if $\psi\colon A \to TM$ is the action of the algebroid, then we have that $df(a)=\psi(a)(f)$ for $f$ in degree zero of the CE complex and $a\in\Gamma(A)$ and $d\omeg …
14
votes
What is a "block" in an abelian category?
It seems clear to me that blocks should have something to do with the
decomposition of the category as a direct product of subcategories. A
decomposition into a product of two factors corresponds exac …
21
votes
Orbit structures of conjugacy class set and irreducible representation set under automorphis...
I think that an example of non-equivalent permutation sets is given by
$G=(\mathbb Z/p\mathbb Z)^n$ for $n>2$ (and $p$ a prime). Then the automorphism
group is $\mathrm{GL}_n(\mathbb Z/p\mathbb Z)$, t …
3
votes
Proof of Steinberg's tensor product theorem
[This was intended to be comment to Ben's reply but I exceeded the allowable limit for comments.]
Actually it doesn't work over any ring. Just take any ring $R$ for which
$GL(V)(R) \to PGL(V)(R)$ is …