Elementary symmetric polynomials and martingales for Heckman-Opdam processes

Abstract

We consider the generators Lk of Heckman-Opdam diffusion processes in the compact and non-compact case in N dimensions for root systems of type A and B, with a multiplicity function of the form k= k0 with some fixed value k0 and a varying constant ∈\,[0,∞[. Using elementary symmetric functions, we present polynomials which are simultaneous eigenfunctions of the Lk for all ∈\,]0,∞[. This leads to martingales associated with the Heckman-Opdam diffusions (Xt,1,…,Xt,N)t0. As our results extend to the freezing case =∞ with a deterministic limit after some renormalization, we find formulas for the expectations E(Πj=1N(y-Xt,j)), y∈ C.