Seminormal basis for the cyclotomic Hecke algebra of type G(r,p,n)

Abstract

The cyclotomic Hecke algebra Hr,p,n of type G(r,p,n) (where r=pd) can be realized as the σ-fixed point subalgebra of certain cyclotomic Hecke algebra Hr,n of type G(r,1,n) with some special cyclotomic parameters, where σ is an automorphism of Hr,n of order p. In this paper we prove a number of rational properties on the γ-coefficients arising in the construction of the seminormal basis for the semisimple Hecke algebra Hr,n. Using these properties, we construct a seminormal basis for the semisimple Hecke algebra Hr,p,n in terms of the seminormal basis for the semisimple Hecke algebra Hr,n. The proof relies on some careful and subtle study on some rational and symmetric properties of some quotients and/or products of γ-coefficients of Hr,n. As applications, we obtain an explicit basis for the center Z(Hr,p,n) and an explicit basis for the σ-twisted k-center Z(Hr,n)(k) of Hr,n for each k∈Z/pZ.

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