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Approximation guarantees for parallelized maximization of monotone non-submodular function with a cardinality constraint

Author

Listed:
  • Min Cui

    (Beijing University of Technology)

  • Dachuan Xu

    (Beijing University of Technology)

  • Longkun Guo

    (Qilu University of Technology (Shandong Academy of Sciences))

  • Dan Wu

    (Henan University of Science and Technology)

Abstract

Emerging applications in machine learning have imposed the problem of monotone non-submodular maximization subject to a cardinality constraint. Meanwhile, parallelism is prevalent for large-scale optimization problems in bigdata scenario while adaptive complexity is an important measurement of parallelism since it quantifies the number of sequential rounds by which the multiple independent functions can be evaluated in parallel. For a monotone non-submodular function and a cardinality constraint, this paper devises an adaptive algorithm for maximizing the function value with the cardinality constraint through employing the generic submodularity ratio $$\gamma $$ γ to connect the monotone set function with submodularity. The algorithm achieves an approximation ratio of $$1-e^{-\gamma ^2}-\varepsilon $$ 1 - e - γ 2 - ε and consumes $$O(\log (n/\eta )/\varepsilon ^2)$$ O ( log ( n / η ) / ε 2 ) adaptive rounds and $$O(n\log \log (k)/\varepsilon ^3)$$ O ( n log log ( k ) / ε 3 ) oracle queries in expectation. Furthermore, when $$\gamma =1$$ γ = 1 , the algorithm achieves an approximation guarantee $$1-1/e-\varepsilon $$ 1 - 1 / e - ε , achieving the same ratio as the state-of-art result for the submodular version of the problem.

Suggested Citation

  • Min Cui & Dachuan Xu & Longkun Guo & Dan Wu, 2022. "Approximation guarantees for parallelized maximization of monotone non-submodular function with a cardinality constraint," Journal of Combinatorial Optimization, Springer, vol. 43(5), pages 1671-1690, July.
  • Handle: RePEc:spr:jcomop:v:43:y:2022:i:5:d:10.1007_s10878-021-00719-z
    DOI: 10.1007/s10878-021-00719-z
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    References listed on IDEAS

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    1. G. L. Nemhauser & L. A. Wolsey, 1978. "Best Algorithms for Approximating the Maximum of a Submodular Set Function," Mathematics of Operations Research, INFORMS, vol. 3(3), pages 177-188, August.
    2. Nemhauser, G.L. & Wolsey, L.A., 1978. "Best algorithms for approximating the maximum of a submodular set function," LIDAM Reprints CORE 343, Université catholique de Louvain, Center for Operations Research and Econometrics (CORE).
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    4. Fisher, M.L. & Nemhauser, G.L. & Wolsey, L.A., 1978. "An analysis of approximations for maximizing submodular set functions - 1," LIDAM Reprints CORE 334, Université catholique de Louvain, Center for Operations Research and Econometrics (CORE).
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