The intersection theory of the moduli stack of vector bundles on $\mathbb{P}^1$

Abstract: We determine the integral Chow and cohomology rings of the moduli stack $\mathcal{B}{r,d}$ of rank $r$, degree $d$ vector bundles on $\mathbb{P}^1$ bundles. We first show that the rational Chow ring $A{\mathbb{Q}}^*(\mathcal{B}_{r,d})$ is a free $\mathbb{Q}$-algebra on $2r+1$ generators. The isomorphism class of this ring happens to be independent of $d$. Then, we prove that the integral Chow ring $A^*(\mathcal{B}_{r,d})$ is torsion-free and provide multiplicative generators for $A^*(\mathcal{B}_{r,d})$ as a subring of $A_{\mathbb{Q}}^*(\mathcal{B}_{r,d})$. From this description, we see that $A^*(\mathcal{B}_{r,d})$ is not finitely generated as a $\mathbb{Z}$-algebra. Finally, the cohomology ring of $\mathcal{B}_{r,d}$ is isomorphic to its Chow ring.