1) KN spectral problem
KN谱问题
1.
Two KN spectral problems (positive , negative) and a discrete spectral problem are investigated in this thesis.
本文对两个连续谱问题(正、负KN谱问题)及一个离散谱问题进行了研究。
2) kN-body problem
kN问题
3) Geng spectral problem
Geng谱问题
1.
In this paper,the isospectral evolution equation hierarchy and the nonisospectral evolution equation hierarchy of Geng spectral problem are presented.
给出了Geng谱问题相应的等谱与非等谱发展方程,并给出等谱发展方程的无穷守恒律;通过AKNS谱问题与Geng谱问题之间的规范变换,得到了Geng谱问题相应的泛函导数。
4) spectral problem
谱问题
1.
Based on a new discrete iso-spectral problem,a hierarchy of integrable nonlinear discrete coupling system is derived,and the Hamiltonian form is constructed.
引入一族离散的谱问题,导出离散的孤子方程族,并研究其相应的离散Hamiltoni-an系统。
2.
Based on a new discrete iso-spectral problem,a hierarchy of integrable nonlinear discrete coupling system is devised.
基于一个离散等谱问题,构建了一族离散可积耦合,利用离散零曲率方程,导出了相应离散的非线性微分-差分方程,进而确定了其相应的Lax可积的离散非线性系统。
5) isospectral problem
等谱问题
1.
Starting from a isospectral problem and basing on the basis number and commutative relations of loop algerba,we propose a type of Liouville integrable system and its bi-Hamiltonian structure by the use of Tu Guizhang s model.
基于一个带有三个位势函数新的等谱问题,本文得到了一个带有任意函数的新的Lax可积族。
2.
It follows that an isospectral problem along with 5 potential functions is established.
构造了一类3×3的反对称loop代数,由此设计了一个含5个位势函数的等谱问题;利用屠格式导出了一个Liouville可积系统,且拥有双Hamilton结构。
3.
Constructing an isospectral problem with an arbitrary smooth function, we propose a type of generalized KN hierarchy and its bi-Hamiltonian structure by the use of Tu Guizhang’s model.
构造了一个带有任意光滑函数的等谱问题,利用屠规彰格式得到广义KN 方程族及其Hamilton结构,并且当f=0时,变为著名的KN谱,当f=-12qr时,变为Qiao谱。
6) Levi spectral problem
Levi谱问题
补充资料:Dihydroxy[29H,31H-phthalocyaninato(2-)-kN29,kN30,kN31,kN32]-silicon
分子式:C32H18N8O2Si
分子量:574.63
CAS号:19333-15-4
性质:
分子量:574.63
CAS号:19333-15-4
性质:
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条