symplectic信息详情
adj.辛的;偶对的
sum of two symplectic matrixes is not symplectic conservation. The product of two symplectic matrixes is symplectic conservation.───两个辛矩阵之和不能保辛,两个辛矩阵的乘积仍是辛矩阵。
symplectic conservative perturbation for a transfer symplectic matrix should be based on the canonical transformation method.───辛矩阵只能在乘法群下保辛,故传递辛矩阵的保辛摄动必须采用正则变换的乘法。
Therefore, it is necessary to study numerical methods which preserve the symplectic structure of the Hamiltonian system.───因此,研究保持哈密尔顿系统的辛几何结构特征的数值方法是必然的。
Then we find the non-symplectic symmetry of the Hamiltonian curved surface, and present a qualitative explanation to the results.───我们从曲面形貌的非偶对称性对调制现象作出了定性的解释。
The connotation and denotation representations of pseudo-symplectic space about symplectic space are demonstrate.───论述过程同时给出了伪辛空间关于辛空间的内蕴和外延表示式。
The essential property and developmental course of Euclidean space, symplectic space and bogus symplectic space are studied.───论述欧氏空间、辛空间、伪辛空间的本质属性及演变过程。
symplectic space and Euclidean space are the internal spaces of bogus symplectic space.───而辛空间与欧氏空间是伪辛空间的内蕴空间的结论。
In this paper, Lie group, Symplectic manifolds, Groupoids are treated as fundamental research subjects .───本文主要以李群、辛流形及群胚等为基本研究对象。
The isomorphic conditions of some lattices generated by transitive sets of subspace under finite pseudo-symplectic groups are discussed.───文章讨论了伪辛群作用下子空间轨道生成的格的同构条件。
The symplectic geometric algorithm and the Ronge-Kutta algorithm are examined from the viewpoint of the algebraic dynamical algorithm.
The error accumulation of dynamics can be eliminated by using canonical equation and symplectic integral method so that the computational accuracy can be ensured effectively.
In this paper, we study the symplectic groupoids structure on the cotangent bundle of Lie group.
Three-step symplectic quantum propagation of wavepacket has been applied to study the photodissociation of methyl iodide.
The nilpotency about the symplectic ternary algebra is discussed in this paper.
In this paper Lie group , Symplectic manifolds, Groupoids are treated as fundamental research subjects.
This dissertation inherits the symplectic method of duality system in applied mechanics, and it can be applied to gyroscopic rotor dynamics.
The symplectic preservation of the finite difference scheme is considered, however, the projection operation onto the constraint manifold still brings problems.
There are tremendous conservative system analyses in physics and applied mechanics, and one of the most important characteristics of a conservative system is its symplectic conservation.