Symmetric ideals of the infinite polynomial ring

Let $R=\mathbf{C}[\xi_1,\xi_2,\ldots]$ be the infinite variable polynomial ring, equipped with the natural action of the infinite symmetric group $\mathfrak{S}$. We classify the $\mathfrak{S}$-primes of $R$, determine the containments among these ideals, and describe the equivariant spectrum of $R$. We emphasize that $\mathfrak{S}$-prime ideals need not be radical, which is a primary source of difficulty. Our results yield a classification of $\mathfrak{S}$-ideals of $R$ up to copotency. Our work is motivated by the interest and applications of $\mathfrak{S}$-ideals seen in recent years.