双线性插值
数学
非线性系统
人工神经网络
多元统计
应用数学
偏微分方程
色散偏微分方程
双线性形式
双线性变换
泰勒级数
数学分析
差速器(机械装置)
算法
广义相对论的精确解
微分方程
偏导数
数学优化
波动方程
作者
Hai‐Peng Wang,Qing Ye,Zhenhui Zhang,Jian‐Guo Liu
摘要
ABSTRACT In this work, the multivariate bilinear neural network method (MBNNM) is applied to derive exact analytical solutions for nonlinear partial differential equations (NPDEs). Specifically, a (2 + 1)‐dimensional spatial symmetric nonlinear dispersive wave model (SSDWM) is investigated by integrating MBNNM with established architectures (3‐2‐2‐1, 3‐2‐3‐1, and 3‐3‐2‐1), while a new 3‐4‐2‐1 architecture is developed for further investigation. By systematically selecting generalized activation functions, diverse exact analytical solutions are obtained, with their dynamic behaviors characterized via 3D/2D plots, contour plots, and density maps. To improve the computational efficiency of MBNNM in handling complex equations, a novel matrix‐based solution strategy is proposed. This strategy significantly enhances computational performance by transforming the Hirota bilinear expansion into matrices for arithmetic processing.
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