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Relaxation Subgradient Algorithms with Machine Learning Procedures

Author

Listed:
  • Vladimir Krutikov

    (Department of Applied Mathematics, Kemerovo State University, Krasnaya Street 6, Kemerovo 650043, Russia)

  • Svetlana Gutova

    (Department of Applied Mathematics, Kemerovo State University, Krasnaya Street 6, Kemerovo 650043, Russia)

  • Elena Tovbis

    (Institute of Informatics and Telecommunications, Reshetnev Siberian State University of Science and Technology, Prosp. Krasnoyarskiy Rabochiy 31, Krasnoyarsk 660031, Russia)

  • Lev Kazakovtsev

    (Institute of Informatics and Telecommunications, Reshetnev Siberian State University of Science and Technology, Prosp. Krasnoyarskiy Rabochiy 31, Krasnoyarsk 660031, Russia)

  • Eugene Semenkin

    (Institute of Informatics and Telecommunications, Reshetnev Siberian State University of Science and Technology, Prosp. Krasnoyarskiy Rabochiy 31, Krasnoyarsk 660031, Russia)

Abstract

In the modern digital economy, optimal decision support systems, as well as machine learning systems, are becoming an integral part of production processes. Artificial neural network training as well as other engineering problems generate such problems of high dimension that are difficult to solve with traditional gradient or conjugate gradient methods. Relaxation subgradient minimization methods (RSMMs) construct a descent direction that forms an obtuse angle with all subgradients of the current minimum neighborhood, which reduces to the problem of solving systems of inequalities. Having formalized the model and taking into account the specific features of subgradient sets, we reduced the problem of solving a system of inequalities to an approximation problem and obtained an efficient rapidly converging iterative learning algorithm for finding the direction of descent, conceptually similar to the iterative least squares method. The new algorithm is theoretically substantiated, and an estimate of its convergence rate is obtained depending on the parameters of the subgradient set. On this basis, we have developed and substantiated a new RSMM, which has the properties of the conjugate gradient method on quadratic functions. We have developed a practically realizable version of the minimization algorithm that uses a rough one-dimensional search. A computational experiment on complex functions in a space of high dimension confirms the effectiveness of the proposed algorithm. In the problems of training neural network models, where it is required to remove insignificant variables or neurons using methods such as the Tibshirani LASSO, our new algorithm outperforms known methods.

Suggested Citation

  • Vladimir Krutikov & Svetlana Gutova & Elena Tovbis & Lev Kazakovtsev & Eugene Semenkin, 2022. "Relaxation Subgradient Algorithms with Machine Learning Procedures," Mathematics, MDPI, vol. 10(21), pages 1-33, October.
    • Handle: RePEc:gam:jmathe:v:10:y:2022:i:21:p:3959-:d:952233
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    References listed on IDEAS

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    1. NESTEROV, Yurii, 2015. "Universal gradient methods for convex optimization problems," LIDAM Reprints CORE 2701, Université catholique de Louvain, Center for Operations Research and Econometrics (CORE).
    2. Friedman, Jerome H. & Hastie, Trevor & Tibshirani, Rob, 2010. "Regularization Paths for Generalized Linear Models via Coordinate Descent," Journal of Statistical Software, Foundation for Open Access Statistics, vol. 33(i01).
    3. Pavel Dvurechensky & Alexander Gasnikov, 2016. "Stochastic Intermediate Gradient Method for Convex Problems with Stochastic Inexact Oracle," Journal of Optimization Theory and Applications, Springer, vol. 171(1), pages 121-145, October.
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    Cited by:

    1. Elena Tovbis & Vladimir Krutikov & Predrag Stanimirović & Vladimir Meshechkin & Aleksey Popov & Lev Kazakovtsev, 2023. "A Family of Multi-Step Subgradient Minimization Methods," Mathematics, MDPI, vol. 11(10), pages 1-24, May.
    2. Liliya A. Demidova, 2023. "Applied and Computational Mathematics for Digital Environments," Mathematics, MDPI, vol. 11(7), pages 1-5, March.

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