Average-case analysis of a greedy algorithm for the 0/1 knapsack problem

Authors

James M. Calvin, Department of Computer Science
Joseph Y.T. Leung, Department of Computer Science

Document Type

Article

Publication Date

5-1-2003

Abstract

We consider the average-case performance of a well-known approximation algorithm for the 0/1 knapsack problem, the decreasing density greedy (DDG) algorithm. Let Un = {u1,⋯, un} be a set of n items, with each item ui having a size si and a profit pi, and Kn be the capacity of the knapsack. Given an instance of the 0/1 knapsack problem, let PL denote the total profit of an optimal solution of the linear version of the problem (i.e., a fraction of an item can be packed in the knapsack) and PDDG denote the total profit of the solution obtained by the DDG algorithm. Assuming that Un is a random sample from the uniform distribution over (0,1]² and Kn = σn for some constant 0 < σ < 1/2, we show that √n(PL - PDDG) converges in distribution. © 2003 Elsevier Science B.V. All rights reserved.

Identifier

0037402226 (Scopus)

Publication Title

Operations Research Letters

External Full Text Location

https://doi.org/10.1016/S0167-6377(02)00222-5

ISSN

01676377

First Page

202

Last Page

210

Issue

3

Volume

31

Recommended Citation

Calvin, James M. and Leung, Joseph Y.T., "Average-case analysis of a greedy algorithm for the 0/1 knapsack problem" (2003). Faculty Publications. 14122.
https://digitalcommons.njit.edu/fac_pubs/14122