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Submodular Maximization Subject to a Knapsack Constraint Under Noise Models

Author

Listed:
  • Dung T. K. Ha

    (Faculty of Information Technology, University of Engineering and Technology, Vietnam National University, Hanoi, 144 Xuan Thuy Street, Cau Giay District, Hanoi 10000, Vietnam)

  • Canh V. Pham

    (ORLab, Faculty of Computer Science, Phenikaa University, Yen Nghia Ward, Ha Dong District, Hanoi, 12116, Vietnam)

  • Huan X. Hoang

    (Faculty of Information Technology, University of Engineering and Technology, Vietnam National University, Hanoi, 144 Xuan Thuy Street, Cau Giay District, Hanoi 10000, Vietnam)

Abstract

The field of Submodular Maximization subject to a Knapsack constraint has recently expanded to a variety of application domains, which is facing some challenges such as data explosions or additional conditions. There exist plenty of objective functions that cannot be evaluated exactly in many real cases unless they are estimated with errors. It leads to solving the problem under noise models. Somewhat surprisingly, Submodular Maximization subject to a Knapsack constraint under Noise models (SMKN) has never been discussed a lot before. Hence, in this paper, we consider the problem with two kinds of noise models which are addition and multiplication. Inspired by the traditional Greedy algorithm, we first propose a Greedy algorithm under Noises with provable theoretical bounds. In order to find the solution when input data are extremely large, we then devise an efficient streaming algorithm that scans only a single pass over the data and guarantees theoretical approximations. Finally, we conduct some experiments on Influence Maximization problem under knapsack constraint, an instance of SMKN to show the performances of the proposed algorithms.

Suggested Citation

  • Dung T. K. Ha & Canh V. Pham & Huan X. Hoang, 2022. "Submodular Maximization Subject to a Knapsack Constraint Under Noise Models," Asia-Pacific Journal of Operational Research (APJOR), World Scientific Publishing Co. Pte. Ltd., vol. 39(06), pages 1-26, December.
    • Handle: RePEc:wsi:apjorx:v:39:y:2022:i:06:n:s0217595922500130
    DOI: 10.1142/S0217595922500130
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    Cited by:

    1. Bich-Ngan T. Nguyen & Phuong N. H. Pham & Van-Vang Le & Václav Snášel, 2022. "Efficient Streaming Algorithms for Maximizing Monotone DR-Submodular Function on the Integer Lattice," Mathematics, MDPI, vol. 10(20), pages 1-19, October.

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