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- 一類非線性Schr(?)dinger方程及其方程組的數值計算問題ON THE PROBLEM OF NUMERICAL CALCULATION FOR A CLASS OF NONLINEAR SCHR(?)DINGER EQUATIONS AND ITS SYSTEM
- 離散非線性Schrǒdinger方程discrete nonlinear Schrǒdinger equation
- 帶斯塔克勢的非線性Schr?dinger方程L~2集中性質L~2-concentration Properties for Nonlinear Schr?dinger Equation with Stark Potential
- dinger方程也有明確的數學物理背景,特別是帶調和勢的非線性Schr(?) dinger方程為描述著名的玻色-愛因斯坦凝聚(BEC)的基礎數學模型([7,8,68,69,78])。The nonlinear Schrodinger equation with potential has also definite physical background, especially the nonlinear Schrodinger equation with a harmonic potential is known as a model for describing the remarkable Bose-Einstein condensate(BEC) ( [7,8,68,69,78]).
- Schr?dinger方程一族高精度恆穩差分格式A Family of Absolutely Stable Difference Schemes of High Accuracy for Solving Schr?dinger Equation
- 氫原子V(r)=-e_s~2/r徑向Schr?dinger方程的精確解EXACT SOLUTION OF THE RADIAL SCHRODINGER EQUATION OF THE HYDROGEN ATOM FOR POTENIAL
- 耦合Klein-Gordon-Schro··dinger方程Coupled Klein-Gordon-Schro··dinger equations
- 耦合非線性波方程coupled nonlinear wave equation
- Schrǒdinger方程Schrǒdinger equation
- 并行求解非線性動力方程Parallel algorithmic of nonlinear dynamical equation
- 求非線性方程的反拋物線法The inverse parabola method with solve nonlinear eguations
- Schr?dinger方程的一個新顯格A New Explicit Difference Scheme for SchrOdinger Equation
- 一類非線性奇攝動方程的周期The period for a class of singular perturbation nonlinear equation
- 本論文研究了具有特殊性質的兩類方程:四階桿振動方程和非線性Schr?In thispaper,two kinds of differential equations with special properties, Four-oder RodVibration equation and Nonlinear Schr?
- 一個非線性方程的顯式行波解EXPLICIT TRAVELLING WAVE SOLUTIONS TO A NONLINEAR EQUATION
- Schr?dinger方程的時空有限元方法與守恆性Space-Time Finite Element Method for the Schrodinger Equation and Its Conservation
- 非線性泛函微分方程的振動性Oscillate of Nonlinear Functional Differential Equations
- 非線性退縮拋物型方程的正解POSITIVE SOLUTION OF NONLINEAR DEGENERATE PARABOLIC EQUATION
- 一個非線性發展方程的準確解Exact Solution of a Nonlinear EvolutionEquation
- 通過構象Schr?dinger方程的數值解,證明在簡諧勢谷中的能譜是等間距的,而在勢谷以上,能譜是非連續的,並具有近似二度簡併的特點。Through the numerical solution of the conformation Schrodinger equation in simple-harmonic potential well, it is proved that the energy spectrum is equalspacing, but the spectrum is not continuous above the well and is doubly degenerate approximatly.