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Homology, Homotopy and Applications
Volume 26 (2024)
Number 2
On the cohomology of the classifying spaces of $SO(n)$-gauge groups over $S^2$
Pages: 121 – 136
DOI: https://dx.doi.org/10.4310/HHA.2024.v26.n2.a6
Author
Abstract
Let $\mathcal{G}_\alpha (X,G)$ be the $G$-gauge group over a space $X$ corresponding to a map $\alpha : X \to B\mathcal{G}_1$. 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 $n \leqslant 4$. As an application, we classify the homotopy types of $SO(n)$-gauge groups over a Riemann surface for $n \leqslant 4$.
Keywords
cohomology, gauge group, classifying space
2010 Mathematics Subject Classification
55R40
Received 6 May 2023
Received revised 28 July 2023
Accepted 1 August 2023
Published 18 September 2024