| 1. | The method of conformal mapping is a tool to achieve this solution . 保角映射法就是一种寻求这个解的工具。 |
| 2. | Angle - preserving mapping and green function 保角映射与格林函数 |
| 3. | Constructing subdivision curves on manifolds using conformal mapping 应用保角映射构造流形上的细分曲线 |
| 4. | Angle preserving mapping 保角映射 |
| 5. | The kernel function is modified by means of a conformal mapping , which makes the kernel function data - dependent 利用与数据有关的保角映射,使核函数具有数据依赖性。 |
| 6. | According to the nonhomogeneous anisotropic elastic and complex function theory , accurate boundary conditions of crack in composite material plate were founded to settle its boundary condition problems by conformal mapping method 摘要针对含裂纹的复合材料板,根据非均质各向异性弹性理论和复变函数理论,通过保角映射方法建立精确的边界条件,解决了裂纹的边界条件问题。 |
| 7. | But the magic of a conformal mapping is that the device is guaranteed to operate in identical fashion to the circular version , just with the geometry of all the critical elements ( semiconductor , metal , field lines and current flows ) transformed by the mapping 不过保角映射的神奇之处在于,它能确保这个装置会以和其圆形版本完全相同的方式运作,所有的关键元素(半导体、金属、场线与电流)都会随著保角映射被转换过去。 |
| 8. | The works in detail are as follows : 1 . base on the essential solution for a complete elastic half space impacted by antiplane line source loading at horizontal surface , the essential solution of displacement field for an elastic half space with an arbitrary - shape - canyon impacted by antiplane harmonic line source loading at horizontal surface is constructed by using the method of complex function and conformal mapping 从完整的弹性半空间表面承受线源荷载作用问题的基本解出发,用复变函数的保角映射方法获得含有任意形凹陷的弹性半空间在其水平面上任意一点承受时间谐和的反平面线源荷载作用时位移场的解答,即本文的green函数。 |
| 9. | Corresponding mathematics model was developed , hole - edge stress analysis on composite material plate with multiform holes was carried out , accurate boundary conditions was founded by conformal mapping method , boundary problems of the two stress functions could be treated by affine transformation in the same way synchronously 建立了相应的数学模型,对含不同孔型复合材料板进行了孔边应力分析,通过保角映射方法建立精确的边界条件,解决了复杂孔型的边界条件问题,借助仿射变换能同时并且同方法的处理这两个应力函数在边界上的问题。 |