| 1. | If the weak solution can be proved to be unique, it is called the generalized solution . 若能证明弱解是唯一的,则称之为广义解。 |
| 2. | The "optimum" weak form is the one for which the trial and test spaces coincide . “最优”的弱解是在测试空间和试验空间重合时得出的。 |
| 3. | Regularity for very weak solutions to a - harmonic equation 调和方程很弱解的正则性 |
| 4. | Existence of suitable weak solutions of navier - stokes equations 方程恰当弱解的存在性 |
| 5. | Existence and its uniqueness of weak solution of elliptic equation 椭圆型方程弱解的存在与唯一性 |
| 6. | Regularity for the very weak solutions of a class of elliptic equation 一类椭圆方程很弱解的正则性 |
| 7. | Regularity of weak solutions to a class of non - homogeneous a - harmonic systems 调和方程组弱解的正则性 |
| 8. | The existence and uniqueness of weak solution for a viscous laplacian equation 方程弱解的存在性与唯一性 |
| 9. | Regularity of very weak solutions for a class ofnonlinear elliptic systems 一类非线性椭圆组很弱解的正则性 |
| 10. | Regularity of weak solutions to a class of degenerate elliptic equations 一类退缩的椭圆型方程弱解的正则性 |