Chern classes of certain representations of symmetric groups

Abstract:

A formula is derived for the Chern classes of the representation id $\int {\xi :P\int {H \to {U_{pn}}} }$ where P is cyclic of order P and $\xi :H \to {U_n}$ is a fintie dimensional unitary representation of the group H. The formula is applied to the problem of calculating the Chern classes of the “natural” representations ${\pi _j}:{\mathcal {S}_j} \to {U_j}$ of symmetric groups by permutation matrices.