具有双重 Tikhonov 正则化的涅斯捷罗夫型算法:函数值的快速收敛和向最小规范解的强收敛

IF 1.6 2区 数学 Q2 MATHEMATICS, APPLIED
Mikhail Karapetyants, Szilárd Csaba László
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引用次数: 0

摘要

我们针对光滑凸函数 f 的最小化问题,研究了带有两个 Tikhonov 正则化项的 Nesterov 类型算法的强收敛特性。我们证明了生成的序列强收敛于 \(\text {argmin}f\) 的最小规范元素。我们还证明了势能 \(f(x_n)-\text {min}f\)和 \(f(y_n)-\text {min}f\)的快速收敛性,其中 \((x_n),\,(y_n)\) 是我们的算法生成的序列。此外,我们还获得了离散速度的快速归零,以及关于生成序列中目标函数梯度值的一些估计。通过一些数值实验,我们表明在我们的算法中需要两个 Tikhonov 正则化项,以获得生成序列对目标函数最小规范最小化的强收敛性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

A Nesterov Type Algorithm with Double Tikhonov Regularization: Fast Convergence of the Function Values and Strong Convergence to the Minimal Norm Solution

A Nesterov Type Algorithm with Double Tikhonov Regularization: Fast Convergence of the Function Values and Strong Convergence to the Minimal Norm Solution

We investigate the strong convergence properties of a Nesterov type algorithm with two Tikhonov regularization terms in connection to the minimization problem of a smooth convex function f. We show that the generated sequences converge strongly to the minimal norm element from \(\text {argmin}f\). We also show fast convergence for the potential energies \(f(x_n)-\text {min}f\) and \(f(y_n)-\text {min}f\), where \((x_n),\,(y_n)\) are the sequences generated by our algorithm. Further we obtain fast convergence to zero of the discrete velocity and some estimates concerning the value of the gradient of the objective function in the generated sequences. Via some numerical experiments we show that we need both Tikhonov regularization terms in our algorithm in order to obtain the strong convergence of the generated sequences to the minimum norm minimizer of our objective function.

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来源期刊
CiteScore
3.30
自引率
5.60%
发文量
103
审稿时长
>12 weeks
期刊介绍: The Applied Mathematics and Optimization Journal covers a broad range of mathematical methods in particular those that bridge with optimization and have some connection with applications. Core topics include calculus of variations, partial differential equations, stochastic control, optimization of deterministic or stochastic systems in discrete or continuous time, homogenization, control theory, mean field games, dynamic games and optimal transport. Algorithmic, data analytic, machine learning and numerical methods which support the modeling and analysis of optimization problems are encouraged. Of great interest are papers which show some novel idea in either the theory or model which include some connection with potential applications in science and engineering.
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