| 1. | A type of generalized variation inequality and its applications
一类变分问题及其应用 |
| 2. | Mixed type duality for multiobjective fractional variational problems
多目标分式变分问题的混合对偶性 |
| 3. | In chapter 5 . we discuss the patch perturbations of a integrable system
第五章研究了可积系统的轨线变分问题。 |
| 4. | Conditional problem of variation
条件变分问题 |
| 5. | Complementary variational problem
余变分问题 |
| 6. | Study of non - self - adjoint variational problem in low - frequency eddy current electromagnetic field
低频涡流电磁场非自伴变分问题的研究 |
| 7. | In the elasticity theory of nematic liquid crystals ( nlc ) , physics principles are described by variation problem initially . so in this paper we use finite elements method to solve this variation problem directly
在液晶的弹性理论中物理规律的数学描述最初是变分问题,因此本文通过有限元方法直接对这一变分问题进行数值求解。 |
| 8. | As we know , fem is a method that transforms differential equations with boundary conditions into a variational problem , and then performs a numerical analysis to get the result . the thesis gives the realization of fem detailedly
有限元是将微分方程转化为变分问题后进行数值求解的数值方法,本文详尽地给出了有限元的实现过程。 |
| 9. | A class of singular nonlinear parabolic equations was considered , after linearing this equations , the corresponding variational problem was obtained , furthermore the existence and uniqueness of weak solution was proved
摘要考虑一类奇异非线性抛物方程,通过对其右端线性化,得到一个与之相应的变分问题,进而证明其弱解的存在唯一性。 |
| 10. | The variational problem related to the coupled vector wave equations and boundary conditions of circular dielectric waveguide with arbitrary refractive index profile is solved using the finite element method ( fem )
应用有限元方法求解了任意径向非均匀折射率分布圆柱对称介质波导中纵向场耦合波动方程定解问题所对应的变分问题,该方法不受弱导或高斯模场分布等限制。 |
