A duality approach to regularized learning problems in Banach spaces

IF 1.8 2区数学 Q1 MATHEMATICS

Journal of Complexity Pub Date : 2023-12-15 DOI:10.1016/j.jco.2023.101818

Raymond Cheng , Rui Wang , Yuesheng Xu

引用次数: 0

Abstract

Regularized learning problems in Banach spaces, which often minimize the sum of a data fidelity term in one Banach norm and a regularization term in another Banach norm, is challenging to solve. We construct a direct sum space based on the Banach spaces for the fidelity term and the regularization term, and recast the objective function as the norm of a quotient space of the direct sum space. We then express the original regularized problem as an optimization problem in the dual space of the direct sum space. It is to find the maximum of a linear function on a convex polytope, which may be solved by linear programming. A solution of the original problem is then obtained by using related extremal properties of norming functionals from a solution of the dual problem. Numerical experiments demonstrate that the proposed duality approach is effective for solving the regularization learning problems.

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巴拿赫空间正则化学习问题的对偶方法

巴拿赫空间中的学习方法通常被表述为正则化问题，即最小化一个巴拿赫规范中的数据保真度项与另一个巴拿赫规范中的正则化项之和。由于空间的无限维性质，解决此类正则化问题具有挑战性。我们根据数据保真项和正则化项的巴拿赫空间构建了一个直接求和空间，然后将目标函数重塑为直接求和空间的一个合适商空间的规范。这样，我们就把原来的正则化问题表达为直接和空间上的非正则化问题，而这个问题又被重新表述为直接和空间对偶空间中的对偶优化问题。对偶问题是求一个凸多面体上线性函数的最大值，可通过线性规划求解。然后，利用对偶问题解中的规范化函数的相关极值特性，就能得到原始问题的解。实验证明，所提出的对偶方法是解决正则化学习问题的一种可实施的数值方法。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

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

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.