功能数据的在线正则化学习算法

IF 1.8 2区 数学 Q1 MATHEMATICS
Yuan Mao, Zheng-Chu Guo
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引用次数: 0

摘要

近年来,函数线性模型在统计学和机器学习领域受到越来越多的关注,其目的是恢复斜率函数或其函数预测器。本文研究了重现核希尔伯特空间中函数线性模型的在线正则化学习算法。在步长多项式衰减和步长不变的情况下,分别对超额预测误差和估计误差进行了收敛分析。通过容量相关分析,可以得出快速收敛率。通过引入显式正则化项,我们提升了非正则化在线学习算法在步长多项式衰减时的饱和边界,并在不考虑容量假设的情况下建立了估计误差的快速收敛率。然而,如何获得步长衰减的非规则化在线学习算法的估计误差的收敛率与容量无关,仍然是一个有待解决的问题。研究还表明,在步长不变的情况下,预测误差和估计误差的收敛率与文献中的收敛率相比具有竞争力。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Online regularized learning algorithm for functional data

In recent years, functional linear models have attracted growing attention in statistics and machine learning for recovering the slope function or its functional predictor. This paper considers online regularized learning algorithm for functional linear models in a reproducing kernel Hilbert space. It provides convergence analysis of excess prediction error and estimation error with polynomially decaying step-size and constant step-size, respectively. Fast convergence rates can be derived via a capacity dependent analysis. Introducing an explicit regularization term extends the saturation boundary of unregularized online learning algorithms with polynomially decaying step-size and achieves fast convergence rates of estimation error without capacity assumption. In contrast, the latter remains an open problem for the unregularized online learning algorithm with decaying step-size. This paper also demonstrates competitive convergence rates of both prediction error and estimation error with constant step-size compared to existing literature.

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来源期刊
Journal of Complexity
Journal of Complexity 工程技术-计算机:理论方法
CiteScore
3.10
自引率
17.60%
发文量
57
审稿时长
>12 weeks
期刊介绍: The multidisciplinary Journal of Complexity publishes original research papers that contain substantial mathematical results on complexity as broadly conceived. Outstanding review papers will also be published. In the area of computational complexity, the focus is on complexity over the reals, with the emphasis on lower bounds and optimal algorithms. The Journal of Complexity also publishes articles that provide major new algorithms or make important progress on upper bounds. Other models of computation, such as the Turing machine model, are also of interest. Computational complexity results in a wide variety of areas are solicited. Areas Include: • Approximation theory • Biomedical computing • Compressed computing and sensing • Computational finance • Computational number theory • Computational stochastics • Control theory • Cryptography • Design of experiments • Differential equations • Discrete problems • Distributed and parallel computation • High and infinite-dimensional problems • Information-based complexity • Inverse and ill-posed problems • Machine learning • Markov chain Monte Carlo • Monte Carlo and quasi-Monte Carlo • Multivariate integration and approximation • Noisy data • Nonlinear and algebraic equations • Numerical analysis • Operator equations • Optimization • Quantum computing • Scientific computation • Tractability of multivariate problems • Vision and image understanding.
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