Tolerance analysis for 0–1 knapsack problems

Pisinger, David; Saidi, Alima

doi:10.1016/j.ejor.2016.10.054

Cited by 7 publications

(4 citation statements)

References 21 publications

(34 reference statements)

Supporting

Mentioning

Contrasting

Order By: Relevance

“…Although this algorithm was invented more than twenty years ago, it still represents the current state-of-the-art (see e.g. [68], [69], [70] and [71] for relatively recent articles that support this claim). This is not surprising, given that the authors of Combo have been conducting research about the 0-1 knapsack problem for at least two decades prior to the publication of the article in which Combo was described [67].…”

Section: Methodsmentioning

confidence: 99%

See 1 more Smart Citation

Exploring search space trees using an adapted version of Monte Carlo tree search for combinatorial optimization problems

Jooken

Leyman²,

Wauters³

et al. 2023

Computers & Operations Research

View full text Add to dashboard Cite

Section: Methodsmentioning

confidence: 99%

“…Although this algorithm was invented more than twenty years ago, it still represents the current state-of-the-art (see e.g. [68], [69], [70] and [71] for relatively recent articles that support this claim). It is able to exactly solve many problem instances containing several thousands of items in a matter of (milli)seconds.…”

Section: The 0-1 Knapsack Problemmentioning

confidence: 99%

Exploring search space trees using an adapted version of Monte Carlo tree search for combinatorial optimization problems

Jooken

Leyman²,

Wauters³

et al. 2023

Computers & Operations Research

View full text Add to dashboard Cite

“…problem [38], [39]. This type of special fractional programming problem is the so-called fractional knapsack problem (FKP) and can be solved by the Dinkelbach algorithm in polynomial time [40].…”

Section: B Model-solving Methods Analysismentioning

confidence: 99%

Optimal Search Facilities Selection Model for Joint Aeronautical and Maritime Search

Xing

2021

IEEE Access

View full text Add to dashboard Cite

Joint aeronautical and maritime search and rescue is the most effective way of performing rescues at sea. The value and effectiveness of a search and rescue (SAR) are far greater when using a coordinated air-maritime search than when using only vessels or aircraft. However, the harmonization of aeronautical and maritime SAR is complex and potentially life-threatening. When the location of the target in distress is unknown, the search process must be carried out. As the sole way to locate and rescue survivors, the search process is the most costly, hazardous, and complicated part of the whole SAR operation. This paper focuses on the key problem of the optimal selection of search facilities, that is often encountered in largearea maritime search practice and urgently needs to be solved in joint aeronautical and maritime search operations. The problem may be abstracted into an optimization model with vessel and aircraft quantitative constraints that fully considers the area of the sea region to be searched, maximum speeds, search capabilities, initial distances of vessels and aircraft from the search area, and maximum endurance of aircraft. By introducing 0-1 decision variables, the search facility selection can be judged and optimized directly and effectively. By analyzing the results with different vessel and aircraft quantities, and taking the relationship between search coverage time and the number of search facilities (cost) into account, the optimal (most economic and feasible) search facility selection scheme can be produced. INDEX TERMS Joint aeronautical and maritime search, marine safety, search facility, optimal model.

show abstract

“…, a n ) ∈ Z n + , b ∈ Z + and x ∈ X = {0, 1} n are important problems in complexity theory and knapsack-based cryptosystems design (see [27], [12], [54], [21], and [20]). Meanwhile subset-sum problems are also a special class of knapsack problems which are important in combinatorial optimization field and always of great interest to researchers (see [25], [44], [45], and [14]). Without loss of generality, we assume that max{a 1 , a 2 , .…”

Section: Introduction 1backgroundmentioning

confidence: 99%

Tackling A Class of Hard Subset-Sum Problems: Integration of Lattice Attacks with Disaggregation Techniques

Lu¹,

Li²,

Jiang³

2022

Preprint

View full text Add to dashboard Cite

Subset-sum problems belong to the NP class and play an important role in both complexity theory and knapsack-based cryptosystems, which have been proved in the literature to become hardest when the so-called density approaches one. Lattice attacks, which are acknowledged in the literature as the most effective methods, fail occasionally even when the number of unknown variables is of medium size. In this paper we propose a modular disaggregation technique and a simplified lattice formulation based on which two lattice attack algorithms are further designed. We introduce the new concept "jump points" in our disaggregation technique, and derive inequality conditions to identify superior jump points which can more easily cut-off non-desirable short integer solutions. Empirical tests have been conducted to show that integrating the disaggregation technique with lattice attacks can effectively raise success ratios to 100% for randomly generated problems with density one and of dimensions up to 100. Finally, statistical regressions are conducted to test significant features, thus revealing reasonable factors behind the empirical success of our algorithms and techniques proposed in this paper.

show abstract

Tolerance analysis for 0–1 knapsack problems

Cited by 7 publications

References 21 publications

Exploring search space trees using an adapted version of Monte Carlo tree search for combinatorial optimization problems

Exploring search space trees using an adapted version of Monte Carlo tree search for combinatorial optimization problems

Optimal Search Facilities Selection Model for Joint Aeronautical and Maritime Search

Tackling A Class of Hard Subset-Sum Problems: Integration of Lattice Attacks with Disaggregation Techniques

Contact Info

Product

Resources

About