| 1. | It is also called a harmonic equation .
它也被称为调合方程。 |
| 2. | The general solution of the simple harmonic equation (3. 1) can therefore be expressed in the following alternative forms .
因此简谐运动方程(31)的通解可用下列任一的形式表示。 |
| 3. | Regularity for very weak solutions to a - harmonic equation
调和方程很弱解的正则性 |
| 4. | Very weak solutions for obstacle problems of weighted a - harmonic equation
一类加权椭圆方程障碍问题的很弱解 |
| 5. | On positive entire solutions to singular , nonlinear poly - harmonic equations in rn n
上奇异非线性多调和方程的正整体解 |
| 6. | Very weak solutions , very weak supersolutions and very weak subsolutions for a - harmonic equations
调和方程的很弱解和很弱上下解 |
| 7. | The harmonic equation , or laplace equation is a typical and simple elliptic partial differential equation
最典型也最简单的椭圆型偏微分方程是调和方程,又称laplace方程。 |
| 8. | The series solution for boundary value problem of nonhomogeneous harmonic equation with variable coefficient is obtained
使变系数非齐次调和方程边值问题的求解有了新的进展。 |
| 9. | The general solution of the simple harmonic equation ( 3 . 1 ) can therefore be expressed in the following alternative forms
因此简谐运动方程( 3 1 )的通解可用下列任一的形式表示。 |
| 10. | In this paper , we study the a - harmonic equation we first prove a local ar - weighted caccioppoli - type inequality for weak solutions to a - harmonic equation . then , by using the methods of hodge decomposition and the weak reverse holder inequality , we prove a regularity result for very weak solutions to a - harmonic equation
在这篇文章中,我们讨论形如diva ( x , ? u ( x ) ) = 0的a -调和方程,证明了其弱解满足的局部a _ ~ -加权caccioppoli型不等式,并以hodge分解和弱逆hlder不等式为工具,得到了其很弱解的正则性结果。 |
