A stationary process associated with the Dirichlet distribution arising from the complex projective space

Abstract

Let (Ut)t ≥ 0 be a Brownian motion valued in the complex projective space CPN-1. Using unitary spherical harmonics of homogeneous degree zero, we derive the densities of |Ut1|2 and of (|Ut1|2, |Ut2|2), and express them through Jacobi polynomials in the simplices of R and R2 respectively. More generally, the distribution of (|Ut1|2, …, |Utk|2), 2 ≤ k ≤ N-1 may be derived using the decomposition of the unitary spherical harmonics under the action of the unitary group U(N-k+1) yet computations become tedious. We also revisit the approach initiated in Nec-Pel and based on a partial differential equation (hereafter pde) satisfied by the Laplace transform of the density. When k=1, we invert the Laplace transform and retrieve the expression derived using spherical harmonics. For general 1 ≤ k ≤ N-2, the integrations by parts performed on the pde lead to a heat equation in the simplex of Rk.