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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.

29 votes
Accepted

Is it possible to realize the Moebius strip as a linear group orbit?

Yes. Here is one way: Consider standard $\mathbb{R}^3$ endowed with the Lorentzian quadratic form $Q = x^2+y^2-z^2$, and let $G\simeq\mathrm{O}(2,1)\subset\mathrm{GL}(3,\mathbb{R})$ be the symmetry …
Robert Bryant's user avatar
5 votes

Invariant theory over $\mathbb R$

As YCor commented, the main point is to show that the invariant polynomials separate orbits. This follows from the compactness of $\mathrm{SO}(n)$. The point is this: Because $\mathrm{SO}(n)$ is co …
Community's user avatar
  • 1
41 votes
Accepted

Is $O_n({\bf Q})$ dense in $O_n({\bf R})$?

There's an easy argument based on the Cayley transform: If $a$ is a skew-symmetric $n$-by-$n$ real matrix, then $I_n+a$ is invertible (since $(I_n-a)(I_n+a)=I_n-a^2$ is a positive definite symmetric …
Robert Bryant's user avatar
2 votes
Accepted

Product of subgroups of $SU(8)$ algebraic set?

Yes, $G_1G_2\subset\mathrm{SU}(8)$ is an algebraic set. Here is the argument: Let $G_1{\times}G_2$ act on $\mathrm{SU}(8)\subset\mathrm{End}(\mathbb{C}^8)\simeq\mathbb{C}^{64}$ by the rule $(g_1,g_2) …
Robert Bryant's user avatar
12 votes
Accepted

To describe an invariant trivector in dimension 8 geometrically

Here's another very nice (but still algebraic) interpretation that explains some of the geometry: Recall that $\operatorname{SL}(2,\mathbb{C})$ has a $2$-to-$1$ representation into $\operatorname{SL} …
LSpice's user avatar
  • 12.9k
8 votes
Accepted

Nilpotent orbits in representations of exceptional groups

As per the OP's comment, we are to assume that $\mathrm{G}_2$ and $\mathrm{F}_4$ mean the complex simple Lie groups. Let's start with $\mathrm{G}_2\subset\mathrm{SO}(7,\mathbb{C})$, in its standard re …
Robert Bryant's user avatar
6 votes
Accepted

Subgroup $\mathrm{E}_6$ generated by $\mathrm{Spin_7}$ and $\mathrm{SL}_3$

N.B.: I am revising my response for clarity. (The actual answer to the question asked by the OP is still the same, but I think that this re-organization, particularly at the end, makes the structure …
Robert Bryant's user avatar
6 votes

Subgroup of $\mathrm{GL}_n$ stabilizing linear subspace skew-symmetric matrices

Here is an outline of the argument that shows that the $\mathrm{SL}_6(\mathbb{C})$-stabilizer of the generic $3$-plane $W\subset\Lambda^2(\mathbb{C}^6)$ has dimension $1$, not $0$, as (apparently) cla …
Robert Bryant's user avatar
13 votes
Accepted

Stabilizer of Sp(n) and U(n) in GL(n)

First, let me fix a misunderstanding: $\mathrm{Sp}(n)$ does not sit in $\mathrm{GL}(n,\mathbb{C})$, but in $\mathrm{GL}(2n,\mathbb{C})$, so I'll assume that you mean, for the second part that $A$ lie …
Robert Bryant's user avatar
8 votes
Accepted

Simultaneous triangularisation of an exterior power of a set of matrices

Here's a simple counterexample to Question 1: Let $d=4$ and $k=2$. Let $X\subset\mathrm{GL}_4(\mathbb{R})$ consist of a single element $J$ where $J^2=-I$. Then $J$ is not conjugate to any upper tri …
Robert Bryant's user avatar
3 votes

Intersection of Subspaces with $O(3)$

The answer to your first question is 'yes, generically, the intersection is finite and transverse'. More precisely, the set $U$ of 6-dimensional subspaces that intersect $\mathrm{SO}(3)$ transversely …
Robert Bryant's user avatar
5 votes
Accepted

Smooth and $GL(n)$-equivariant implies algebraic?

If I understand you correctly, the answer is 'no'. Because the open set $L_n\subset B_n$ is an orbit of $\mathrm{GL}^+(n,\mathbb{R})$ under the natural representation of $\mathrm{GL}^+(n,\mathbb{R} …
Robert Bryant's user avatar
17 votes

Spin group as an automorphism group

It seems that you are asking for descriptions of the groups $\mathrm{Spin}(p,q)$ as algebraic groups. This can certainly be done explicitly for low values of $p$ and $q$, but I don't know a general p …
Robert Bryant's user avatar
5 votes

degrees of the invariants for the action of $SL(V)$ on $\wedge^4V$

This was worked out explicitly by A. A. Katanova in her paper Explicit form of certain multivector invariants in Advances in Soviet Mathematics 8 (1992), pp. 87-93. According to her calculations, the …
Robert Bryant's user avatar
81 votes

Beautiful descriptions of exceptional groups

It is not always clear what one means by 'the simplest description' of one of the exceptional Lie groups. In the examples you've given above, you quote descriptions of these groups as automorphisms o …
Robert Bryant's user avatar

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