Added the Mackey-Arens theorem.
This commit is contained in:
@@ -43,7 +43,7 @@
|
||||
|
||||
\begin{definition}
|
||||
\label{definition:derivative-garden}
|
||||
Let $E, F$ be TVSs over $K \in \RC$ with $F$ being separated, $\sigma^E_{\text{Fin}}, \sigma^E_{c}, \sigma^E_b \subset 2^E$ be the collection of all finite, precompact, and bounded subsets, respectively, then differentiability with respect to $\sigma^E_{\text{Fin}}, \sigma^E_{c}, \sigma^E_b$ correspond to \textbf{Gateaux}, \textbf{Hadamard}, and \textbf{Fréchet} differentiability.
|
||||
Let $E, F$ be TVSs over $K \in \RC$ with $F$ being separated, $\sigma^E_{\text{Fin}}, \sigma^E_{c}, \sigma^E_b \subset 2^E$ be the collection of all finite, relatively compact, and bounded subsets, respectively, then differentiability with respect to $\sigma^E_{\text{Fin}}, \sigma^E_{c}, \sigma^E_b$ correspond to \textbf{Gateaux}, \textbf{Hadamard}, and \textbf{Fréchet} differentiability.
|
||||
\end{definition}
|
||||
|
||||
|
||||
@@ -84,7 +84,7 @@
|
||||
\label{proposition:chain-rule-sets-conditions}
|
||||
Let $E$, $F$, $G$, be TVSs over $K \in \RC$ with $F, G$ being separated. If $\sigma \subset \mathfrak{B}(E)$ and $\tau \subset \mathfrak{B}(F)$ correspond to the following families of sets on $E$ and $F$:
|
||||
\begin{enumerate}
|
||||
\item Precompact sets.
|
||||
\item Relatively compact sets.
|
||||
\item Bounded sets.
|
||||
\end{enumerate}
|
||||
|
||||
|
||||
Reference in New Issue
Block a user