Abstract
Let η be a complex n-plane bundle over the total space of a cyclic covering of prime index p. We show that for k E {1,2,...,np} {p,2p,..., np} the k-th Chern class of the transferred bundle differs from a certain transferred class w k of η by a polynomial in the Chern classes c p ,..., c np of the transferred bundle. The polynomials are defined by the formal group law and certain equalities in K(s)*B(Z/p x U(n)).
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