矢量值全态函数和抽象富比尼型定理

Pub Date : 2024-07-10 DOI:10.1007/s00013-024-02019-4

Bernhard H. Haak, Markus Haase

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引用次数: 0

摘要

让（f = f(z,t)）是一个对于固定的（t）在（Omega）中在（O \subseteq{\mathbb{C}}^d\）中全态的函数，并且对于固定的（t）在（Omega）中是可测量的，这样（f = f(z,t)）在（E：=textrm{L}_{p}(\Omega )\),$1\le p\le \infty $。证明了（除其他外）$$\begin{aligned}（开始{aligned}）。\三角形t映射到三角形f(f(\cdot ,t)),\mu\rangle = \varphi (z 映射到三角形f(z, \cdot ),\mu\rangle )\end{aligned}$$whenever $\mu \in E'$ and $\varphi $ is a bp-continuous linear functional on $\textrm{H}^\infty (O)$.

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Vector-valued holomorphic functions and abstract Fubini-type theorems

Let $f = f(z,t)$ be a function holomorphic in $z \in O \subseteq {\mathbb {C}}^d$ for fixed $t\in \Omega $ and measurable in t for fixed z and such that $z \mapsto f(z,\cdot )$ is bounded with values in $E:= \textrm{L}_{p}(\Omega )$, $1\le p \le \infty $. It is proved (among other things) that

$$\begin{aligned} \langle t\mapsto \varphi ( f(\cdot ,t)),\mu \rangle = \varphi (z \mapsto \langle f(z, \cdot ),\mu \rangle ) \end{aligned}$$

whenever $\mu \in E'$ and $\varphi $ is a bp-continuous linear functional on $\textrm{H}^\infty (O)$.

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