Poincar\'e Inequality for Dirichlet Distributions and Infinite-Dimensional Generalizations

Abstract

For any N 2 and :=(1,·s, N+1)∈ (0,∞)N+1, let μ(N) be the corresponding Dirichlet distribution on := \ x=(xi)1 i N∈ [0,1]N:\ Σ1 i N xi 1\. We prove the Poincar\'e inequality μ(N)(f2) 1 N+1 ∫\(1-Σ1 i N xi) Σn=1N xn(n f)2\μ(N)( x)+μ(N)(f)2,\ f∈ C1() and show that the constant 1 N+1 is sharp. Consequently, the associated diffusion process on converges to μ(N) in L2(μ(N)) at the exponentially rate N+1. The whole spectrum of the generator is also characterized. Moreover, the sharp Poincar\'e inequality is extended to the infinite-dimensional setting, and the spectral gap of the corresponding discrete model is derived.