2
$\begingroup$

I do not know much about Geometric Invariant Theory. My question is the following:

Let $X$ and $Y$ be two complex affine or projective varieties. Let $G$ be a reductive group which acts on both $X$ and $Y$. Let $\pi_X: X \to X//G$ and $\pi_Y: Y \to Y//G$ be the "projection" maps to the G.I.T quotients. If $Z\subset X$ and $W \subset Y$ are closed $G$-invariant subsets and $f: Z \to W$ is a bijection, under which conditions $f$ descends to a bijection $\bar{f}: \pi_X(Z) \to \pi_Y(W)$ ?

$\endgroup$
1
  • 1
    $\begingroup$ In the projective setting you also need line bundles to define GIT quotients, so you also need to have the extra assumption that $f$ pulls back one to the other. $\endgroup$
    – Misha
    Jan 30, 2013 at 13:17

2 Answers 2

1
$\begingroup$

This kind of question is more easily adressed on the “other” side of algebraic geometry: let us look at what happens at level of function algebras.

Assume $f_0: X_0 \to Y_0$ is the corestriction of your morphism on a affine open subset $Y_0$ of $Y$ and a restriction to a $G$-stable affine open subset $X_0$ of $X$ mapped in $Y_0$ by $f$.

On the side of algebras, you have a morphism of algebras $A(f_0): A(Y_0) \to A(X_0)$ whose image is contained in the subalgebra $A(X_0)^G$ of $G$-invariant functions. So you can decompose $A(f_0) = A(\pi_0) \circ j$, where $j$ is induced by the canonical inclusion of $A(X_0)^G$ in $A(X_0)$ and define $\bar f$ by $A(\bar f) = j$.

In some situations, it might be impossible to find that $X_0$. Consider the case of the normaliser $N$ of a maximal torus $T$ in $\mathbf{SL}_2$ operating on $\mathbf{P}^1$: the element generating $N/T$ exchanges the two fixed points of $T$ so none of them is contained in a suitable $X_0$. This is why the theory of stable points used by Mumford has to remove these points before doing the quotient.

$\endgroup$
0
$\begingroup$

as long as $f$ passes to the quotient (i.e. sends orbits on orbits) it has the required property. Moreover, as Misha remarked, the semistable locus of the first quotient should be sent to the semistable locus of the second quotient. This basically mean that the pullback of the invariants on the codomain must give the invariants of the domain.

$\endgroup$
2
  • 2
    $\begingroup$ On the set-theoretic level, GIT quotients are not defined as orbit spaces, but "extended" orbit spaces, where two semistable orbits are identified whenever their closures (in the set of semistable points) have nonempty intersection. Thus, in addition to orbit preservation, you also need the requirement that semistable points go to semistable points as well as, say, continuity of $f$. (In all natural examples, of course, $f$ will be a regular map.) $\endgroup$
    – Misha
    Jan 30, 2013 at 16:41
  • $\begingroup$ correct. I had forgotten to add that point. $\endgroup$
    – IMeasy
    Jan 30, 2013 at 17:42

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service and acknowledge you have read our privacy policy.

Not the answer you're looking for? Browse other questions tagged or ask your own question.