用于 B-样条逼近的深度神经网络求解器

IF 4.3 3区 材料科学 Q1 ENGINEERING, ELECTRICAL & ELECTRONIC
Zepeng Wen , Jiaqi Luo , Hongmei Kang
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引用次数: 0

摘要

本文介绍了一种新颖的无监督深度学习方法,用于解决 B-样条近似领域中的节点位置问题,即深度神经网络求解器(DNN-Solvers)。在给定离散点的情况下,DNN 充当解算器,计算固定节点数情况下的节点位置。输入可以是任何初始结点,输出则是理想的结点。损失函数基于近似误差。DNN 求解器将低维绳结位置问题(非凸非线性优化问题)转换为在高维空间内搜索合适的网络参数。由于过度参数化的特性,DNN-求解器不易陷入局部最小值,对初始结点也很稳健。此外,DNN-Solvers 的无监督学习模式使我们无需构建高质量的带标签合成数据集。数值实验证明,在节点数量适当的前提下,DNN求解器的近似结果和效率都非常出色。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
The deep neural network solver for B-spline approximation

This paper introduces a novel unsupervised deep learning approach to address the knot placement problem in the field of B-spline approximation, called deep neural network solvers (DNN-Solvers). Given discrete points, the DNN acts as a solver for calculating knot positions in the case of a fixed knot number. The input can be any initial knots and the output provides the desirable knots. The loss function is based on the approximation error. The DNN-Solver converts the lower-dimensional knot placement problem, characterized as a nonconvex nonlinear optimization problem, into a search for suitable network parameters within a high-dimensional space. Owing to the over-parameterization nature, DNN-Solvers are less likely to be trapped in local minima and robust against initial knots. Moreover, the unsupervised learning paradigm of DNN-Solvers liberates us from constructing high-quality synthetic datasets with labels. Numerical experiments demonstrate that DNN-Solvers are excellent in both approximation results and efficiency under the premise of an appropriate number of knots.

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来源期刊
CiteScore
7.20
自引率
4.30%
发文量
567
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