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Pattern-Multiplicative Average of Nonnegative Matrices: When a Constrained Minimization Problem Requires Versatile Optimization Tools

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  • Vladimir Yu. Protasov

    (Faculty DISIM, University of L’Aquila, 67100 L’Aquila, Italy
    Faculty of Computer Science of National Research, University Higher School of Economics, 109028 Moscow, Russia
    Department of Mechanics and Mathematics, Moscow State University, 119992 Moscow, Russia)

  • Tatyana I. Zaitseva

    (Department of Mechanics and Mathematics, Moscow State University, 119992 Moscow, Russia
    Moscow Center for Fundamental and Applied Mathematics, 119992 Moscow, Russia)

  • Dmitrii O. Logofet

    (Laboratory of Mathematical Ecology, A.M. Obukhov Institute of Atmospheric Physics, Russian Academy of Sciences, 119017 Moscow, Russia)

Abstract

Given several nonnegative matrices with a single pattern of allocation among their zero/nonzero elements, the average matrix should have the same pattern as well. This is the first tenet of the pattern-multiplicative average (PMA) concept, while the second one suggests the multiplicative nature of averaging. The concept of PMA was motivated in a number of application fields, of which we consider the matrix population models and illustrate solving the PMA problem with several sets of model matrices calibrated in particular botanic case studies. The patterns of those matrices are typically nontrivial (they contain both zero and nonzero elements), the PMA problem thus having no exact solution for a fundamental reason (an overdetermined system of algebraic equations). Therefore, searching for the approximate solution reduces to a constrained minimization problem for the approximation error, the loss function in optimization terms. We consider two alternative types of the loss function and present a general algorithm of searching the optimal solution: basin-hopping global search, then local descents by the method of conjugate gradients or that of penalty functions. Theoretical disadvantages and practical limitations of both loss functions are discussed and illustrated with a number of practical examples.

Suggested Citation

  • Vladimir Yu. Protasov & Tatyana I. Zaitseva & Dmitrii O. Logofet, 2022. "Pattern-Multiplicative Average of Nonnegative Matrices: When a Constrained Minimization Problem Requires Versatile Optimization Tools," Mathematics, MDPI, vol. 10(23), pages 1-15, November.
  • Handle: RePEc:gam:jmathe:v:10:y:2022:i:23:p:4417-:d:982038
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    References listed on IDEAS

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    1. Logofet, Dmitrii O., 2013. "Projection matrices in variable environments: λ1 in theory and practice," Ecological Modelling, Elsevier, vol. 251(C), pages 307-311.
    2. Wenyu Sun & Ya-Xiang Yuan, 2006. "Optimization Theory and Methods," Springer Optimization and Its Applications, Springer, number 978-0-387-24976-6, June.
    3. Tamás Vinkó & Kitti Gelle, 2017. "Basin Hopping Networks of continuous global optimization problems," Central European Journal of Operations Research, Springer;Slovak Society for Operations Research;Hungarian Operational Research Society;Czech Society for Operations Research;Österr. Gesellschaft für Operations Research (ÖGOR);Slovenian Society Informatika - Section for Operational Research;Croatian Operational Research Society, vol. 25(4), pages 985-1006, December.
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    Cited by:

    1. Logofet, Dmitrii O. & Maslov, Alexander A., 2023. "Markov chain retrospective analysis or how to detect a position of the monitoring period in the course of postfire succession," Ecological Modelling, Elsevier, vol. 484(C).
    2. Dmitrii O. Logofet, 2023. "Pattern-Multiplicative Average of Nonnegative Matrices Revisited: Eigenvalue Approximation Is the Best of Versatile Optimization Tools," Mathematics, MDPI, vol. 11(14), pages 1-12, July.

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