English

Analysis of Baseline Evolutionary Algorithms for the Packing While Travelling Problem

Neural and Evolutionary Computing 2019-07-02 v2

Abstract

The performance of base-line Evolutionary Algorithms (EAs) on combinatorial problems has been studied rigorously. From the theoretical viewpoint, the literature extensively investigates the linear problems, while the theoretical analysis of the non-linear problems is still far behind. In this paper, variations of the Packing While Travelling (PWT) -- also known as the non-linear knapsack problem -- are studied as an attempt to analyse the behaviour of EAs on non-linear problems from theoretical perspective. We investigate PWT for two cities and nn items with correlated weights and profits, using single-objective and multi-objective algorithms. Our results show that RLS\_swap, which differs from the classical RLS by having the ability to swap two bits in one iteration, finds the optimal solution in O(n3)O(n^3) expected time. We also study an enhanced version of GSEMO, which a specific selection operator to deal with exponential population size, and prove that it finds the Pareto front in the same asymptotic expected time. In the case of uniform weights, (1+1)~EA is able to find the optimal solution in expected time O(n2log(max{n,pmax}))O(n^2\log{(\max\{n,p_{\max}\})}), where pmaxp_{\max} is the largest profit of the given items. We also perform an experimental analysis to complement our theoretical investigations and provide additional insights into the runtime behavior.

Keywords

Cite

@article{arxiv.1902.04692,
  title  = {Analysis of Baseline Evolutionary Algorithms for the Packing While Travelling Problem},
  author = {Vahid Roostapour and Mojgan Pourhassan and Frank Neumann},
  journal= {arXiv preprint arXiv:1902.04692},
  year   = {2019}
}

Comments

This paper has been accepted in FOGA 2019

R2 v1 2026-06-23T07:39:24.745Z