Hodge decomposition of the symmetric product of a curve

Question

Let X be a smooth projective connected curve over $\mathbb{C}$ and let $n>1$ be an integer. Let $Y= Sym^n_X$ be the $n$-th symmetric product of $X$.

Is there, for every $i$, a nice formula for the Hodge decomposition of $H^i(Y,\mathbb{C})$?

If not, what part of the Hodge diamond can be described easily?

Answer 1

Look at Example $1.1$ in this paper for a nice formula.

You can also compute them by hands (and, hopefully, prove the desired formula) by identifying $\mathrm{H}^{p,q}(\operatorname{Sym}^n X)$ with $S_n$-invariant part of $\mathrm{H}^{p,q}(X^n)$ (use the Kunneth's formula to compute the latter group).