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Assigning and Scheduling Generalized Malleable Jobs Under Subadditive or Submodular Processing Speeds

Author

Listed:
  • Dimitris Fotakis

    (School of Electrical and Computer Engineering, National Technical University of Athens, 10682 Athens, Greece)

  • Jannik Matuschke

    (Research Center for Operations Management, KU Leuven, 3000 Leuven, Belgium)

  • Orestis Papadigenopoulos

    (Data Science Institute, Columbia University, New York, New York 10027)

Abstract

Malleable scheduling is a model that captures the possibility of parallelization to expedite the completion of time-critical tasks. A malleable job can be allocated and processed simultaneously on multiple machines, occupying the same time interval on all these machines. We study a general version of this setting, in which the functions determining the joint processing speed of machines for a given job follow different discrete concavity assumptions (subadditivity, fractional subadditivity, submodularity, and matroid ranks). We show that under these assumptions, the problem of scheduling malleable jobs at minimum makespan can be approximated by a considerably simpler assignment problem. Moreover, we provide efficient approximation algorithms for both the scheduling and the assignment problem, with increasingly stronger guarantees for increasingly stronger concavity assumptions, including a logarithmic approximation factor for the case of submodular processing speeds and a constant approximation factor when processing speeds are determined by matroid rank functions. Computational experiments indicate that our algorithms outperform the theoretical worst-case guarantees.

Suggested Citation

  • Dimitris Fotakis & Jannik Matuschke & Orestis Papadigenopoulos, 2025. "Assigning and Scheduling Generalized Malleable Jobs Under Subadditive or Submodular Processing Speeds," Operations Research, INFORMS, vol. 73(3), pages 1598-1614, May.
    • Handle: RePEc:inm:oropre:v:73:y:2025:i:3:p:1598-1614
    DOI: 10.1287/opre.2022.0168
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