物理
守恒定律
对称(几何)
非线性系统
幂级数
系列(地层学)
数学物理
分数阶微积分
非线性薛定谔方程
幂律
经典力学
数学分析
量子力学
数学
生物
统计
古生物学
几何学
作者
Jicheng Yu,Yuqiang Feng,Yapeng Shi
标识
DOI:10.1142/s0217732325501615
摘要
Nonlinear fractional Schrödinger equations play an important role in quantum mechanics, one of which with a variable coefficient is studied by Lie symmetry analysis method in this paper. We obtained two Lie symmetries and the admissible coefficient [Formula: see text], which maintain the governing equation invariant, and used one of the obtained symmetries to reduce nonlinear fractional partial differential equations to nonlinear fractional ordinary differential equations in the sense of the Caputo fractional derivative. Then we applied the power series method to obtain the power series solutions of the reduced equations, thereby proving their convergence and providing the dynamic analysis of their truncated graphs. In addition, the new conservation theorem and the generalization of Noether operators developed by Ibragimov are used to construct the conservation laws for the equations studied.
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