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Algebraic varieties with group operations given by morphisms, or group objects in the category of algebraic varieties, the category of algebraic schemes, or closely related categories.

3 votes

Quotient space of algebraic group

You want to show that $T_eH=\{D\in T_eG\mid\delta_DI\subset I\}$. This is something general about smooth subvarieties of a variety. The left hand side maps to the right hand side by functoriality of t …
Wilberd van der Kallen's user avatar
8 votes
Accepted

Connected components of the orthogonal group O(2n) in characteristic 2.

Presumably this is treated in detail in chapter 7 of the book The Classical Groups and K-Theory, by A.J.Hahn and O.T.O'Meara. On page 424 it says in theorem 7.2.23 that the elementary subgroup has i …
Wilberd van der Kallen's user avatar
1 vote

Extension property for unipotent linear groups over rings

To get some clarity it may help to consider the example where $G=\{\pmatrix{1&t\cr 0&e^u}\mid t, u\in \mathbb R\}$. The adjoint action of its Lie algebra is not right for a unipotent group.
Wilberd van der Kallen's user avatar
1 vote

Maps between symmetric powers of the natural module for $SL_2 (k)$ in prime characteristic

Let me summarize. We take a basis $x$, $y$ of $E$ and the characteristic is $p$. There are two cases where there is a surjective map $E\otimes S^r(E)\to S^{r-1}E$. The first case is when $r=p-1$. The …
Wilberd van der Kallen's user avatar
7 votes
2 answers
574 views

Does the action of an affine group scheme preserve the nilradical of an algebra?

Let $k$ be a commutative ring and let $G$ be a flat affine algebraic group scheme over $k$. Let $G$ act by algebra automorphisms on the commutative $k$-algebra $A$. So $G(R)$ acts by $R$-algebra auto …
Wilberd van der Kallen's user avatar
6 votes
Accepted

Global homological dimension of reductive groups

In positive characteristic the only connected groups of finite homological dimension are the tori. We need the following result from Jantzen, Representations of algebraic groups. [J, I 5.13], [J, I …
Wilberd van der Kallen's user avatar
5 votes
Accepted

Behavior of invariants under reduction mod p

No. Let $G=SL_n$, acting on its defining representation $V$, with $n\geq2$. Let $R=\mathbb{Z}[X_1,\dots,X_n]$ be the obvious $\mathbb{Z}$-form of the ring of polynomial functions on $V$. Let $p$ be a …
Wilberd van der Kallen's user avatar