A note on homotopy types of connected components of Map(S^4,BSU(2))

Details A note on homotopy types of connected components of Map(S^4,BSU(2)) A note on homotopy types of connected components of Map(S^4,BSU(2))

2011-01-22

arxiv.org/abs/1101.4278v1

Mathematics

Algebraic Topology

Scientific paper

Connected components of $\Map(S^4,B\SU(2))$ are the classifying spaces of gauge groups of principal $\SU(2)$-bundles over $S^4$. Tsukuda [Tsu01] has investigated the homotopy types of connected components of $\Map(S^4,B\SU(2))$. But unfortunately, the proof of Lemma 2.4 in [Tsu01] is not correct for $p=2$. In this paper, we give a complete proof. Moreover, we investigate the further divisibility of $\epsilon_i$ defined in [Tsu01]. In [Tsu], it is shown that divisibility of $\epsilon_i$ have some information about $A_i$-equivalence types of the gauge groups.

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