A New Bound on the Cumulant Generating Function of Dirichlet Processes

Abstract

In this paper, we introduce a novel approach for bounding the cumulant generating function (CGF) of a Dirichlet process (DP) X DP(α 0), using superadditivity. In particular, our key technical contribution is the demonstration of the superadditivity of α EX DP(α 0)[( EX[α f])], where EX[f] = ∫ f dX. This result, combined with Fekete's lemma and Varadhan's integral lemma, converts the known asymptotic large deviation principle into a practical upper bound on the CGF X DP(α0)(EX[f]) for any α > 0. The bound is given by the convex conjugate of the scaled reversed Kullback-Leibler divergence αKL(0 ·). This new bound provides particularly effective confidence regions for sums of independent DPs, making it applicable across various fields.