Two points and $n$ th derivatives norm inequalities for analytic functions in Banach algebras

  • S. S. Dragomir College Engineering and Sci., Victoria Univ., Melbourne, Australia; School Comput. Sci. and Appl.Math., Univ. Witwatersrand, Johannesburg, South Africa

Анотація

УДК 517.5
нерiвностi для норми двох точок i $n$ -ї похiдної для аналiтичних функцiй у банахових алгебрах

Нехай $\mathcal{B}$ — унiтальна алгебра Банаха, $a \in \mathcal{B},$ $G$ — опукла область в $\mathbb{C}$ з $\sigma (a) \subset G,$, $\alpha, \beta \in G,$, а $f \colon G \rightarrow \mathbb{C}$
є аналiтичною на $G$. Використовуючи аналiтичне функцiональне числення, ми отримуємо серед iнших такий результат:
\begin{gather*}
\left\| f(a) - \frac{1}{2}\sum_{k=0}^{n}\frac{1}{k!}\left[
f^{(k) }(\alpha) (a-\alpha)
^{k}+(-1)^{k}f^{(k) }(\beta) (\beta-a)^{k}\right] \right\|\leq
\\
\leq \frac{1}{2(n+1) !}\left[\|a-\alpha\|
^{n+1}+\|\beta - a\|^{n+1}\right]\times
\\
\times \max \left\{\sup_{s\in [0,1] }\left\| f^{(n+1) }[(1-s) \alpha+sa] \right\|,\sup_{s\in [0,1] }\left\| f^{(n+1) }[(1-s) a+s\beta] \right\| \right\}.
\end{gather*}
Наведено також деякi приклади для експоненцiальних функцiй на алгебрах Банаха

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Опубліковано
04.10.2022
Як цитувати
DragomirS. S. «Two Points and $n$ Th Derivatives Norm Inequalities for Analytic Functions in Banach Algebras». Український математичний журнал, вип. 74, вип. 8, Жовтень 2022, с. 1086 -06, doi:10.37863/umzh.v74i8.6116.
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