On the cohomology of the classifying spaces of SO(n)-gauge groups over S2
Abstract
Let Gα(X, G) be the G-gauge group over a space X corresponding to a map α X BG. We compute the integral cohomology of BG1(S2, SO(n)) for n = 3,4. We also show that the homology of BG1(S2, SO(n)) is torsion free if and only if n 4. As an application, we classify the homotopy types of SO(n)-gauge groups over a Riemann surface for n 4.
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