Homotopy types of Spinc(n)-gauge groups over S4
Abstract
The gauge group of a principal G-bundle P over a space X is the group of G-equivariant homeomorphisms of P that cover the identity on X. We consider the gauge groups of bundles over S4 with Spinc(n), the complex spin group, as structure group and show how the study of their homotopy types reduces to that of Spin(n)-gauge groups over S4. We then advance on what is known by providing a partial classification for Spin(7)- and Spin(8)-gauge groups over S4.
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