求解非线性欠定方程组的准牛顿法的收敛性

IF 1.6 2区 数学 Q2 MATHEMATICS, APPLIED
N. Vater, A. Borzì
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引用次数: 0

摘要

研究了求解非线性欠定方程系统的准牛顿方法的开发和收敛分析。这些方程出现在许多应用领域,例如大型过参数化神经网络的监督学习,这就需要开发具有收敛性保证的高效方法。本文提出了一种计算来自布洛伊登更新的近似雅各布逆的摩尔-彭罗斯逆的新方法,并证明了阻尼准牛顿方法的半局部收敛结果。理论结果详细说明了多维二次方程组的情况,并在特征值问题和过参数化神经网络的监督学习中得到了验证。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Convergence of a quasi-Newton method for solving systems of nonlinear underdetermined equations

Convergence of a quasi-Newton method for solving systems of nonlinear underdetermined equations

The development and convergence analysis of a quasi-Newton method for the solution of systems of nonlinear underdetermined equations is investigated. These equations arise in many application fields, e.g., supervised learning of large overparameterised neural networks, which require the development of efficient methods with guaranteed convergence. In this paper, a new approach for the computation of the Moore–Penrose inverse of the approximate Jacobian coming from the Broyden update is presented and a semi-local convergence result for a damped quasi-Newton method is proved. The theoretical results are illustrated in detail for the case of systems of multidimensional quadratic equations, and validated in the context of eigenvalue problems and supervised learning of overparameterised neural networks.

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来源期刊
CiteScore
3.70
自引率
9.10%
发文量
91
审稿时长
10 months
期刊介绍: Computational Optimization and Applications is a peer reviewed journal that is committed to timely publication of research and tutorial papers on the analysis and development of computational algorithms and modeling technology for optimization. Algorithms either for general classes of optimization problems or for more specific applied problems are of interest. Stochastic algorithms as well as deterministic algorithms will be considered. Papers that can provide both theoretical analysis, along with carefully designed computational experiments, are particularly welcome. Topics of interest include, but are not limited to the following: Large Scale Optimization, Unconstrained Optimization, Linear Programming, Quadratic Programming Complementarity Problems, and Variational Inequalities, Constrained Optimization, Nondifferentiable Optimization, Integer Programming, Combinatorial Optimization, Stochastic Optimization, Multiobjective Optimization, Network Optimization, Complexity Theory, Approximations and Error Analysis, Parametric Programming and Sensitivity Analysis, Parallel Computing, Distributed Computing, and Vector Processing, Software, Benchmarks, Numerical Experimentation and Comparisons, Modelling Languages and Systems for Optimization, Automatic Differentiation, Applications in Engineering, Finance, Optimal Control, Optimal Design, Operations Research, Transportation, Economics, Communications, Manufacturing, and Management Science.
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