Description Complexity of Regular Distributions

Abstract

Myerson's regularity condition of a distribution is a standard assumption in economics. In this paper, we study the complexity of describing a regular distribution within a small statistical distance. Our main result is that (ε-0.5) bits are necessary and sufficient to describe a regular distribution with support [0,1] within ε Levy distance. We prove this by showing that we can learn the regular distribution approximately with O(ε-0.5) queries to the cumulative density function. As a corollary, we show that the pricing query complexity to learn the class of regular distribution with support [0,1] within ε Levy distance is (ε-2.5). To learn the mixture of two regular distributions, (ε-3) pricing queries are required.