物理
无穷小
对称(几何)
数学物理
李代数
李群
孤子
无穷小变换
黎曼假设
微分方程
常微分方程
对称群
数学分析
偏微分方程
广义相对论的精确解
椭圆余弦波
伴随表象
参数统计
精确微分方程
波动方程
功能(生物学)
波函数
经典力学
谎言理论
一阶偏微分方程
Lie导数
多样性(控制论)
初等函数
量子力学
Kadomtsev–Petviashvili方程
椭圆函数
薛定谔方程
Riccati方程
类型(生物学)
仿射李代数
作者
Rajesh Kumar,Dig Vijay Tanwar,Satya Jeet Singh
标识
DOI:10.1139/cjp-2025-0303
摘要
The objective of this study is to investigate the generalized Calogero–Bogoyavlenskii–Schiff (gCBS) equation using Lie symmetry method. The gCBS equation characterizes the interaction between a Riemann wave moving in the y-axis and a long wave propagating along the x-axis. By applying the invariance principle of Lie group theory, the infinitesimal generators and corresponding Lie algebra are systematically derived. Utilizing the similarity function and variable, the symmetry reductions of gCBS equation is obtained, which result to an equivalent ordinary differential equation. Thus, a number of exact analytical solutions are constructed under specific parametric conditions. The physical behavior of these obtained solutions has been investigated using the numerical simulation. Accordingly, a variety of wave phenomena such as doubly soliton nature, parabolic, elastic multisoliton, multisoliton, and periodic wave profiles are illustrated through detailed graphical representation.
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