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This article is cited in 3 scientific papers (total in 3 papers)
MATHEMATICAL MODELING AND NUMERICAL SIMULATION
A gradient method with inexact oracle for composite nonconvex optimization
P. E. Dvurechenskiiab a Weierstrass Institute for Applied Analysis and Stochastics,
39 Mohrenstraße, Berlin, 10117, Germany
b Moscow Institute of Physics and Technology,
9 Institutskiy per., Dolgoprudny, Moscow Region, 141701, Russia
Abstract:
In this paper, we develop a new first-order method for composite nonconvex minimization problems with simple constraints and inexact oracle. The objective function is given as a sum of «hard», possibly nonconvex part, and «simple» convex part. Informally speaking, oracle inexactness means that, for the «hard» part, at any point we can approximately calculate the value of the function and construct a quadratic function, which approximately bounds this function from above. We give several examples of such inexactness: smooth nonconvex functions with inexact Hölder-continuous gradient, functions given by the auxiliary uniformly concave maximization problem, which can be solved only approximately. For the introduced class of problems, we propose a gradient-type method, which allows one to use a different proximal setup to adapt to the geometry of the feasible set, adaptively chooses controlled oracle error, allows for inexact proximal mapping. We provide a convergence rate for our method in terms of the norm of generalized gradient mapping and show that, in the case of an inexact Hölder-continuous gradient, our method is universal with respect to Hölder parameters of the problem. Finally, in a particular case, we show that the small value of the norm of generalized gradient mapping at a point means that a necessary condition of local minimum approximately holds at that point.
Keywords:
nonconvex optimization, composite optimization, inexact oracle, Hölder-continuous gradient, universal gradient methods.
Received: 11.02.2022 Accepted: 13.02.2022
Citation:
P. E. Dvurechenskii, “A gradient method with inexact oracle for composite nonconvex optimization”, Computer Research and Modeling, 14:2 (2022), 321–334
Linking options:
https://www.mathnet.ru/eng/crm970 https://www.mathnet.ru/eng/crm/v14/i2/p321
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Abstract page: | 105 | Full-text PDF : | 44 | References: | 34 |
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