A note on the Segal-Becker type splittings (Q2266258)

Segal and Becker have discovered splitting maps \(\epsilon\) for maps \(\lambda\) : \(\Omega\) \({}^{\infty}\Sigma^{\infty}(X)\to Y\) where X is \({\mathbb{C}}P^{\infty}\) or \(HP^{\infty}\) or BO(2), and Y is BU, BSp, and BO, respectively. The author gives a construction of the splitting maps different from Becker's construction, by using representation theory. Then he shows that these splittings are related by natural homotopy commutative diagrams.