C2n-equivariant rational stable stems and characteristic classes
Abstract
In this short note, we compute the rational C2n-equivariant stable stems and give minimal presentations for the RO(C2n)-graded Bredon cohomology of the equivariant classifying spaces BC2nS1 and BC2n2 over the rational Burnside functor A Q. We also examine for which compact Lie groups L the maximal torus inclusion T L induces an isomorphism from H*C2n(BC2nL;A Q) onto the fixed points of H*C2n(BC2nT;A Q) under the Weyl group action. We prove that this holds for L=U(m) and any n,m 1 but does not hold for L=SU(2) and n>1.
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