它共分六个部分:映射定理;单叶调和函数的数值估计;特殊映射;变分方法;境界性质和在极小曲面中的应用。
It contains six parts: mapping theorems, numerical estimations of univalent harmonic functions, special mappings, variational method, boundary behavior and applications to minimal surfaces.
本文的第四章研究的是单叶调和函数模的偏差估计,我们将拟共形映射理论与调和函数理论相互结合起来,用新定义的角伸缩商宋对单叶调和函数的模给出新的估计。
We research it by some new knowledge combining the quasiconformal theory with the harmonic theory. A new estimate of modulus is given which is relation to the angular dilatation.
应用推荐