Spherical functions on the space of p-adic unitary hermitian matrices II, the case of odd size

Abstract

We are interested in the harmonic analysis on p-adic homogeneous spaces based on spherical functions. In the present paper, we investigate the space X of unitary hermitian matrices of odd size over a p-adic field of odd residual characteristic, which is a continuation of our previous paper where we have studied for even size matrices. First we give the explicit representatives of the Cartan decomposition of X and introduce a typical spherical function ω(x;z) on X. After studying the functional equations, we give an explicit formula for ω(x;z), where Hall-Littlewood polynomials of type Cn appear as a main term, though the unitary group acting on X is of type BCn. By spherical transform, we show the Schwartz space S(K X) is a free Hecke algebra H(G, K)-module of rank 2n, where 2n+1 is the size of matrices in X, and give parametrization of all the spherical functions on X and the explicit Plancherel formula on S(K X).