Suppose that $G$ is a reductive group that acts algebraically on an affine variety $X$ over an algebraically closed field $k$.

Suppose also that $G$ is equipped with amaximal torus $T$ such that
the quotient group $G/T$ is finite abelian.

**My question:** Under what circumstances can I conclude that a categorical/good quotient $X/\!\!/G$ coincides with a categorical/good quotient for $G/T$ acting on $X/\!\!/T$?

That is, under what circumstances is there a birational equivalence between
$X/\!\!/G$ and
$$
(X/\!\!/T)/\!\!/(G/T) \,\, ?
$$
If there is such a result, can someone point me to a place in the literature where it can be found?