Advances in Low-Memory Subgradient Optimization

P. Dvurechensky; A. Gasnikov; Nurminski E.; Stonyakin F.

doi:10.1007/978-3-030-34910-3_2

Publications

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Advances in Low-Memory Subgradient Optimization

P. 19–59.

Dvurechensky P., Gasnikov A., Nurminski E., Stonyakin F.

This chapter is devoted to the blackbox subgradient algorithms with the minimal requirements for the storage of auxiliary results, which are necessary to execute these algorithms. To provide historical perspective this survey starts with the original result of Shor which opened this field with the application to the classical transportation problem. The theoretical complexity bounds for smooth and nonsmooth convex and quasiconvex optimization problems are briefly exposed in what follows to introduce the relevant fundamentals of nonsmooth optimization. Special attention in this section is given to the adaptive step size policy which aims to attain lowest complexity bounds. Nondifferentiability of objective function in convex optimization significantly slows down the rate of convergence in subgradient optimization compared to the smooth case, but there are different modern techniques that allow to solve nonsmooth convex optimization problems faster than dictate theoretical lower complexity bounds. In this work the particular attention is given to Nesterov smoothing technique, Nesterov universal approach, and Legendre (saddle point) representation approach. The new results on universal mirror prox algorithms represent the original parts of the survey. To demonstrate application of nonsmooth convex optimization algorithms to solution of huge-scale extremal problems we consider convex optimization problems with nonsmooth functional constraints and propose two adaptive mirror descent methods. The first method is of primal-dual variety and proved to be optimal in terms of lower oracle bounds for the class of Lipschitz continuous convex objectives and constraints. The advantages of application of this method to the sparse truss topology design problem are discussed in essential details. The second method can be used for solution of convex and quasiconvex optimization problems and it is optimal in terms of complexity bounds. The conclusion part of the survey contains the important references that characterize recent developments of nonsmooth convex optimization.

Keywords: convex optimization

In book

Numerical Nonsmooth Optimization

Springer, 2020.

On Linear Convergence in Smooth Convex-Concave Bilinearly-Coupled Saddle-Point Optimization: Lower Bounds and Optimal Algorithms

Borodich E., Gasnikov A., Kovalev D., , in: Volume 267: International Conference on Machine Learning, 13-19 July 2025, Vancouver Convention Center, Vancouver, CanadaVol. 267.: [б.и.], 2025. P. 5045–5100.

Added: November 18, 2025

Solving Convex Min-Min Problems with Smoothness and Strong Convexity in One Group of Variables and Low Dimension in the Other

Gladin E., Alkousa M., Gasnikov A., Automation and Remote Control 2021 Vol. 82 P. 1679–1691

The article deals with some approaches to solving convex problems of the min-min type with smoothness and strong convexity in only one of the two groups of variables. It is shown that the proposed approaches based on Vaidya’s method, the fast gradient method, and the accelerated gradient method with variance reduction have linear convergence. It ...

Added: November 29, 2024

Vaidya’s method for convex stochastic optimization problems in small dimension

Gladin E., Gasnikov A., Ermakova E., Mathematical notes 2022 Vol. 112 No. 1 P. 183–190

The paper deals with a general problem of convex stochastic optimization in a space of small dimension (for example, 100 variables). It is known that for deterministic problems of convex optimization in small dimensions, the methods of centers of gravity type (for example, Vaidya’s method) provide the best convergence. For stochastic optimization problems, the question ...

Added: November 29, 2024

Accuracy Certificates for Convex Minimization with Inexact Oracle

Gladin E., Gasnikov A., Dvurechensky P., Journal of Optimization Theory and Applications 2025 Vol. 204 No. 1 Article 1

Accuracy certificates for convex minimization problems allow for online verification of the accuracy of approximate solutions and provide a theoretically valid online stopping criterion. When solving the Lagrange dual problem, accuracy certificates produce a simple way to recover an approximate primal solution and estimate its accuracy. In this paper, we generalize accuracy certificates for the ...

Added: November 29, 2024

Метод эллипсоидов для задач выпуклой стохастической оптимизации малой размерности

Gladin E., Зайнуллина К. Э., Компьютерные исследования и моделирование 2021 Т. 13 № 6 С. 1137–1147

The article considers minimization of the expectation of convex function. Problems of this type often arise in machine learning and a variety of other applications. In practice, stochastic gradient descent (SGD) and similar procedures are usually used to solve such problems. We propose to use the ellipsoid method with mini-batching, which converges linearly and can ...

Added: November 29, 2024

Обзор выпуклой оптимизации марковских процессов принятия решений

Rudenko V., Yudin N., Васин А. А., Компьютерные исследования и моделирование 2023 Т. 15 № 2 С. 329–353

This article reviews both historical achievements and modern results in the field of Markov Decision Process (MDP) and convex optimization. This review is the first attempt to cover the field of reinforcement learning in Russian in the context of convex optimization. The fundamental Bellman equation and the criteria of optimality of policy — strategies based on it, ...

Added: November 29, 2024

Breaking the Heavy-Tailed Noise Barrier in Stochastic Optimization Problems

Puchkin N., Gorbunov E., Kutuzov N. et al., , in: Proceedings of The 27th International Conference on Artificial Intelligence and Statistics (AISTATS 2024), 2-4 May 2024, Palau de Congressos, Valencia, Spain. PMLR: Volume 238Vol. 238.: Valencia: PMLR, 2024. P. 856–864.

We consider stochastic optimization problems with heavy-tailed noise with structured density. For such problems, we show that it is possible to get faster rates of convergence than 𝑂(𝐾^{−2(𝛼−1)/𝛼}), when the stochastic gradients have finite 𝛼-th moment, 𝛼∈(1,2]. In particular, our analysis allows the noise norm to have an unbounded expectation. To achieve these results, we stabilize stochastic gradients, ...

Added: April 22, 2024

Accelerated zeroth-order method for non-smooth stochastic convex optimization problem with infinite variance

Kornilov N., Shamir O., Lobanov A. et al., , in: Advances in Neural Information Processing Systems 36 (NeurIPS 2023).: Curran Associates, Inc., 2023. P. 64083–64102.

Added: March 26, 2024

Distributed Methods with Compressed Communication for Solving Variational Inequalities, with Theoretical Guarantees

Beznosikov A., Richtarik P., Diskin M. et al., , in: Thirty-Sixth Conference on Neural Information Processing Systems : NeurIPS 2022.: Curran Associates, Inc., 2022. P. 14013–14029.

Added: January 27, 2023

On a Combination of Alternating Minimization and Nesterov’s Momentum

Guminov S., Dvurechensky P., Tupitsa N. et al., , in: Proceedings of the 38th International Conference on Machine Learning (ICML 2021)Vol. 139.: PMLR, 2021. P. 3886–3898.

Added: October 30, 2022

Oracle Complexity Separation in Convex Optimization

Ivanova A., Dvurechensky P., Vorontsova E. et al., Journal of Optimization Theory and Applications 2022 Vol. 193 No. 1-3 P. 462–490

Many convex optimization problems have structured objective functions written as a sum of functions with different oracle types (e.g., full gradient, coordinate derivative, stochastic gradient) and different arithmetic operations complexity of these oracles. In the strongly convex case, these functions also have different condition numbers that eventually define the iteration complexity of first-order methods and ...

Added: October 28, 2022

Application of the nested convex programming to the optimal power flow in MT-HVDC grids

Garces A., Azhmyakov V., IFAC-PapersOnLine 2020 Vol. 53 No. 2 P. 13173–13177

This paper deals with an application of the nested convex programming to the optimal power flow (OPF) in multi-terminal high-voltage direct-current grids (MT-HVDC). The real-world optimization problem under consideration is non-convex. This fact implies some possible inconsistencies of the conventional numerical minimization algorithms (such as interior point method). Moreover, the constructive numerical treatment of this ...

Added: October 30, 2021

Inexact model: a framework for optimization and variational inequalities

Stonyakin F., Tyurin A., Gasnikov A. et al., Optimization Methods and Software 2021 Vol. 36 No. 6 P. 1155–1201

In this paper, we propose a general algorithmic framework for the first-order methods in optimization in a broad sense, including minimization problems, saddle-point problems and variational inequalities (VIs). This framework allows obtaining many known methods as a special case, the list including accelerated gradient method, composite optimization methods, level-set methods, Bregman proximal methods. The idea ...

Added: October 29, 2021

Decentralized and parallel primal and dual accelerated methods for stochastic convex programming problems

Dvinskikh D., Gasnikov A., Journal of Inverse and Ill-posed problems 2021 Vol. 29 No. 3 P. 385–405

We introduce primal and dual stochastic gradient oracle methods for decentralized convex optimization problems. Both for primal and dual oracles, the proposed methods are optimal in terms of the number of communication steps. However, for all classes of the objective, the optimality in terms of the number of oracle calls per node takes place only ...

Added: October 29, 2021

Near-Optimal High Probability Complexity Bounds for Non-Smooth Stochastic Optimization with Heavy-Tailed Noise

Gorbunov E., Danilova M., Shibaev I. et al., / Series arXiv:2106.05958 "arXiv:2106.05958". 2021.

Thanks to their practical efficiency and random nature of the data, stochastic first-order methods are standard for training large-scale machine learning models. Random behavior may cause a particular run of an algorithm to result in a highly suboptimal objective value, whereas theoretical guarantees are usually proved for the expectation of the objective value. Thus, it ...

Added: October 25, 2021

Local SGD: Unified Theory and New Efficient Methods

Gorbunov E., Hanzely F., Richtarik P., , in: International Conference on Artificial Intelligence and Statistics, 13-15 April 2021, VirtualVol. 130.: PMLR, 2021. Ch. 130 P. 3556–3564.

Added: October 25, 2021

Alternating minimization methods for strongly convex optimization

Tupitsa N., Dvurechensky P., Gasnikov A. et al., Journal of Inverse and Ill-posed problems 2021 Vol. 29 No. 5 P. 721–739

We consider alternating minimization procedures for convex and non-convex optimization problems with the vector of variables divided into several blocks, each block being amenable for minimization with respect to its variables while maintaining other variables' blocks constant. In the case of two blocks, we prove a linear convergence rate for alternating minimization procedure under the ...

Added: September 29, 2021

On Primal and Dual Approaches for Distributed Stochastic Convex Optimization over Networks

Dvinskikh D., Gorbunov E., Gasnikov A. et al., , in: 2019 IEEE 58th Conference on Decision and Control (CDC).: IEEE, 2019. P. 7435–7440.

We introduce primal and dual stochastic gradient oracle methods for distributed convex optimization problems over networks. We show that the proposed methods are optimal (in terms of communication steps) for primal and dual oracles. Additionally, for a dual stochastic oracle, we propose a new analysis method for the rate of convergence in terms of duality ...

Added: February 5, 2021

Near Optimal Methods for Minimizing Convex Functions with Lipschitz p-th Derivatives

Gasnikov A., Gorbunov E., Dvurechensky P. et al., , in: Proceedings of Machine Learning Research Vol. 99: Conference on Learning Theory, 25-28 June 2019, Phoenix, AZ, USA. PMLR, 2019.: PMLR, 2019. P. 1392–1393.

In this merged paper, we consider the problem of minimizing a convex function with Lipschitzcontinuous p-th order derivatives. Given an oracle which when queried at a point returns the first p-derivatives of the function at that point we provide some methods which compute an ε approximate minimizer in O ε − 2 3p+1 ...

Added: February 5, 2021