二维逆问题/黎曼映射定理

For every proper simply connected open subset U of the complex plane C there exists a one-to-one conformal Riemann map from U onto the open unit disk D. Since the composition of harmonic and analytic function is harmonic, the Riemann map provides a one-to-one correspondence b/w harmonic functions defined on the set U and on the disc D. Therefore, one can transfer a solution of Dirichlet boundary problem on the set D to the domain U. 

Let ${\displaystyle f:U\rightarrow D}$ be a Riemann map for the region U, the kernel of the Dirichlet-to-Neumann map for the region U can be expressed in terms of the kernel for the disc.

练习 (*)。证明 ${\displaystyle K_{U}(\phi ,\theta )=|f'(\phi )|K_{D}(f(\phi ),f(\theta ))|f'(\theta )|}$ 在对角线之外。

The Cayley transform ${\displaystyle {\frac {1-z}{1+z}}:C^{+}\rightarrow D}$ maps the complex right half-plane onto the unit disc.

练习 (**)。推导出单位圆盘D的DN映射核的公式：${\displaystyle K_{D}(\phi ,\theta )={\frac {-1}{\pi (1-cos(\phi -\theta ))}}}$ 使用半平面核公式和泊松核的径向导数，求解圆盘上的狄利克雷边界问题

${\displaystyle K_{P}(z,\theta )={\frac {1-|z|^{2}}{2\pi |1-ze^{-i\theta }|^{2}}}.}$

In order to solve a continuous inverse problem by data discretisation, one may obtain Dirichlet-to-Neumann (DN) matrix by uniform sampling of the kernel off the diagonal, and by defining the diagonal entries so, that rows and columns of the DN matrix sum up to zero. This leads to the following definition of the matrix in the case of the unit disc:

${\displaystyle \Lambda _{kl}={\begin{cases}{\frac {2n(n+1)}{3}},{\mbox{ }}k=l,\\{\frac {-1}{1-\cos {\frac {2\pi (k-l)}{2n+1}}}},{\mbox{ }}k\neq l,\end{cases}}}$ 其中n是自然数，k,l = 1,2, ... 2n+1。

练习 (**)。证明矩阵的特征值是自然数 (!) ${\displaystyle 2n,4n-2,6n-6,\ldots ,n(n+1)}$ 重数为二，0 重数为一。