弦弧域上的德里赫特空间

Huaying Wei, Michel Zinsmeister
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引用次数: 0

摘要

如果 $U$ 是一个在平面上具有紧凑支持的 $C^{infty}$ 函数,我们设$u$ 是它对单位圆 $\mathbb{S}$ 的限制,并用$U_i,\,U_e$ 表示 $u$ 分别在黎曼球上 $\mathbb S$ 的内部和外部的谐波扩展。大约一百年前,道格拉斯证明了\iint_{\mathbb{D}}|\nabla U_i|^2(z)dxdy&=\iint_{\bar{\mathbb{C}}\backslash\bar{\mathbb{D}}}|\nabla U_e|^2(z)dxdy &= \frac{1}{2\pi}\iint_{\mathbb S\times\mathbbS}\left|\frac{u(z_1)-u(z_2)}{z_1-z_2}\right|^2|dz_1||dz_2|,\end{align*}因此有三种方法来表达 $u$ 的狄利克特规范。在一条可矫正的乔丹曲线 $\Gamma$ 上,我们有这三种表达式的明显类似物,当然它们在一般情况下并不相等。本文的主要目标是证明,当且仅当 $\Gamma$ 是一条弦-曲线时,这三个 $$(半)规范是等价的。
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Dirichlet spaces over chord-arc domains
If $U$ is a $C^{\infty}$ function with compact support in the plane, we let $u$ be its restriction to the unit circle $\mathbb{S}$, and denote by $U_i,\,U_e$ the harmonic extensions of $u$ respectively in the interior and the exterior of $\mathbb S$ on the Riemann sphere. About a hundred years ago, Douglas has shown that \begin{align*} \iint_{\mathbb{D}}|\nabla U_i|^2(z)dxdy&= \iint_{\bar{\mathbb{C}}\backslash\bar{\mathbb{D}}}|\nabla U_e|^2(z)dxdy &= \frac{1}{2\pi}\iint_{\mathbb S\times\mathbb S}\left|\frac{u(z_1)-u(z_2)}{z_1-z_2}\right|^2|dz_1||dz_2|, \end{align*} thus giving three ways to express the Dirichlet norm of $u$. On a rectifiable Jordan curve $\Gamma$ we have obvious analogues of these three expressions, which will of course not be equal in general. The main goal of this paper is to show that these $3$ (semi-)norms are equivalent if and only if $\Gamma$ is a chord-arc curve.
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