A Linearithmic Time Locally Optimal Algorithm for the Multiway Number Partition Optimization

Abstract

We study the problem of multiway number partition optimization, which has a myriad of applications in the decision, learning and optimization literature. Even though the original multiway partitioning problem is NP-hard and requires exponential time complexity algorithms; we formulate an easier optimization problem, where our goal is to find a solution that is locally optimal. We propose a linearithmic time complexity O(N N) algorithm that can produce such a locally optimal solution. Our method is robust against the input and requires neither positive nor integer inputs.