On the cohomology of the classifying spaces of $SO(n)$-gauge groups over $S^2$

Abstract: Let $\mathcal{G}{\alpha}(X, G)$ be the $G$-gauge group over a space $X$ corresponding to a map $\alpha \colon X \to BG$. We compute the integral cohomology of $B\mathcal{G}{1}(S^2, SO(n))$ for $n = 3,4$. We also show that the homology of $B\mathcal{G}_{1}(S^2, SO(n))$ is torsion free if and only if $n\le 4$. As an application, we classify the homotopy types of $SO(n)$-gauge groups over a Riemann surface for $n\le 4$.