Stable Centres I: Wreath Products

Abstract

A result of Farahat and Higman shows that there is a ``universal'' algebra, FH, interpolating the centres of symmetric group algebras, Z(ZSn). We explain that this algebra is isomorphic to R , where R is the ring of integer-valued polynomials and is the ring of symmetric functions. Moreover, the isomorphism is via ``evaluation at Jucys-Murphy elements'', which leads to character formulae for symmetric groups. Then, we generalise this result to wreath products Sn of a fixed finite group . This involves constructing wreath-product versions R and (*) of R and , respectively, which are interesting in their own right (for example, both are Hopf algebras). We show that the universal algebra for wreath products, FH, is isomorphic to R (*) and use this to compute the p-blocks of wreath products.