Maximum Entropy Interval Aggregations

Abstract

Given a probability distribution p = (p1, …, pn) and an integer 1≤ m < n, we say that q = (q1, …, qm) is a contiguous m-aggregation of p if there exist indices 0=i0 < i1 < ·s < im-1 < im = n such that for each j = 1, …, m it holds that qj = Σk=ij-1+1ij pk. In this paper, we consider the problem of efficiently finding the contiguous m-aggregation of maximum entropy. We design a dynamic programming algorithm that solves the problem exactly, and two more time-efficient greedy algorithms that provide slightly sub-optimal solutions. We also discuss a few scenarios where our problem matters.