Note on approximating the Laplace transform of a Gaussian on a complex disk

Abstract

In this short note we study how well a Gaussian distribution can be approximated by distributions supported on [-a,a]. Perhaps, the natural conjecture is that for large a the almost optimal choice is given by truncating the Gaussian to [-a,a]. Indeed, such approximation achieves the optimal rate of e-(a2) in terms of the L∞-distance between characteristic functions. However, if we consider the L∞-distance between Laplace transforms on a complex disk, the optimal rate is e-(a2 a), while truncation still only attains e-(a2). The optimal rate can be attained by the Gauss-Hermite quadrature. As corollary, we also construct a ``super-flat'' Gaussian mixture of (a2) components with means in [-a,a] and whose density has all derivatives bounded by e-(a2 (a)) in the O(1)-neighborhood of the origin.