柯西分布
数学
初值问题
数学物理
纯数学
数学分析
应用数学
作者
Yufeng Zhang,Linlin Gui
出处
期刊:Axioms
[Multidisciplinary Digital Publishing Institute]
日期:2024-12-27
卷期号:14 (1): 11-11
被引量:5
标识
DOI:10.3390/axioms14010011
摘要
A.S. Fokas has obtained integrable nonlinear partial differential equations (PDEs) in 4 + 2 dimensions by complexifying the independent variables. In this work, the complexification of the independent variables of the 2 + 1-dimensional Caudrey–Dodd–Gibbon–Kotera–Sawada (CDGKS) equation yields the 4 + 2 integrable extension of the CDGKS equation. Then, by transforming two temporal variables, the CDGKS equation in three dimensions is reduced, and the Lax pairs of the corresponding equations are given. Finally, the solutions of Cauchy problems for the CDGKS equation in three spatial and two temporal dimensions are constructed by introducing a novel nonlocal d-bar formalism, in which several new long derivative operators, Dx, Dy, and Dt, are constructed for the study of the initial value problem for the CDGKS equation. Some significant propositions and results are presented in this paper.
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