Let $G:=GL_{N}$ act on its Lie algebra $\mathfrak{g}:=\mathfrak{gl}_{N}$ by conjugation. Then it acts naturally on the associated ring $\mathcal{O}(\mathfrak{g})$ of (algebraic or analytic) functions on $\mathfrak{g}$, yielding the associated GIT quotient $\mathcal{O}(\mathfrak{g})//G$, namely the spectrum $\operatorname{Spec}(\mathcal{O}(\mathfrak{g})^{G})$ of the $G$-invariant functions. Since the regular semisimple elements of $\mathfrak{g}$ are dense in $\mathfrak{g}$, this ring is the (algebraic or analytic) symmetric functions in the eigenvalues of the variables from $\mathfrak{g}$, so it is essentially the symmetric power $\operatorname{Sym}^{N}\mathbb{A}^{1}$.

I'm interested in the tangent space of this variety, in the natural variables (namely functions of the eigenvalues). On the regular semisimple locus, the map from $\mathbb{A}^{N}$ to that symmetric power is a local isomorphism, so that the usual tangent space to $\mathbb{A}^{N}$ at such points does the trick. However, on the non-regular locus, this is no longer the case, and it seems that the natural elements from $\mathfrak{g}$ no longer produce the full tangent space. In fact, one needs some "fractional powers of the differentials" for getting the full tangent space. This is, at least, what my investigations of this question produced.

My question is - is there any reference dealing with this object? I'd like to compare what I got to the existing literature (if there is such), and see whether there are better ways to view these tangent spaces than what I received. Thanks!