Gadat, Sébastien, Panloup, Fabien and Saadane, Sofiane (2018) Stochastic Heavy Ball. Electronic Journal of Statistics, 12 (1). pp. 461-529.
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Abstract
This paper deals with a natural stochastic optimization procedure derived from the so-called Heavy-ball method differential equation, which was introduced by Polyak in the 1960s with his seminal contribution [Pol64]. The Heavy-ball method is a second-order dynamics that was investigated to minimize convex functions f. The family of second-order methods recently received a large amount of attention, until the famous contribution of Nesterov [Nes83], leading to the explosion of large-scale optimization problems. This work provides an in-depth description of the stochastic heavy-ball method, which is an adaptation of the deterministic one when only unbiased evalutions of the gradient are available and used throughout the iterations of the algorithm. We first describe some almost sure convergence results in the case of general non-convex coercive functions f. We then examine the situation of convex and strongly convex potentials and derive some non-asymptotic results about the stochastic heavy-ball method. We end our study with limit theorems on several rescaled algorithms.
Item Type: | Article |
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Language: | English |
Date: | 2018 |
Refereed: | Yes |
Uncontrolled Keywords: | Stochastic optimization algorithms, Second-order methods, Random dynamical systems |
Subjects: | B- ECONOMIE ET FINANCE |
Divisions: | TSE-R (Toulouse) |
Site: | UT1 |
Date Deposited: | 22 May 2018 11:34 |
Last Modified: | 02 Apr 2021 15:57 |
OAI Identifier: | oai:tse-fr.eu:32573 |
URI: | https://publications.ut-capitole.fr/id/eprint/25889 |
Available Versions of this Item
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Stochastic Heavy Ball. (deposited 19 Oct 2016 07:29)
- Stochastic Heavy Ball. (deposited 22 May 2018 11:34) [Currently Displayed]