Revisiting the Random Subset Sum problem

Abstract

The average properties of the well-known Subset Sum Problem can be studied by the means of its randomised version, where we are given a target value z, random variables X1, …, Xn, and an error parameter > 0, and we seek a subset of the Xis whose sum approximates z up to error . In this setup, it has been shown that, under mild assumptions on the distribution of the random variables, a sample of size O((1/)) suffices to obtain, with high probability, approximations for all values in [-1/2, 1/2]. Recently, this result has been rediscovered outside the algorithms community, enabling meaningful progress in other fields. In this work we present an alternative proof for this theorem, with a more direct approach and resourcing to more elementary tools.