The Rational Homotopy of Stable Cp-Smoothings

Abstract

Smooth structures on high dimensional manifolds are classified by maps to the infinite loop space TOP/O. The homotopy groups of this space are known to be finite. Given a compact Lie group G, this space can be regarded as an equivariant infinite loop space and equivariant maps from a locally linear, high dimensional G-manifold to TOP/O classify stable G-smoothings. We compute the equivariant homotopy groups πVCpTOP/O where Cp denotes the cyclic group of order p. By applying our methods to the group C4, we prove a Chern class analogue of Novikov's theorem on rational Pontryagin classes.

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