I want to study the space $Y$ of all un-ordered $d$-tuples of points on $\mathbb P^1$. By considering the space $V_d$ of homogeneous polynomials of degree $d$ in two variables, one may identify $Y$ with $\mathbb P(V_d)\equiv \mathbb P^d$. There is a natural $SL_2$ action on $\mathbb P(V_d)\equiv Y$ via change of coordinates. For simplicity, the field is assumed to be $\mathbb C$, and let me assume $d=4$ in the sequel.
I want to study the subspace $Y_s \subset Y$ consisting of un-ordered 4-tuples of pairwise distinct points. Indeed $Y_s$ is the locus of stable points according to Hilbert-Mumford criterion. Put $G=SL_2$. Denote $Y_{ss}$ the locus of semi-stable points.
Question: What is the geometric quotient $Y_s / / G$ or $Y_{ss} / / G$?
I guess the first answer should be $\mathbb A^1$. Intuitively, $Y_s / /G$ characterizes the orbits. If I specify three points of the tuple to be $0,1,\infty$, then the fourth point can vary within almost all of $\mathbb A^1$. The issue might be that here the tuples are un-ordered. And the second answer, I guess, might be $\mathbb P^1$, since $Y_{ss} / /G $ is a projective variety by its construction. (I am a beginner so I cannot guarantee what I said was completely correct.) Thank you for your time.
