Category:Exponential Order

From ProofWiki
Jump to navigation Jump to search

This category contains results about Exponential Order.


Let $f: \R \to \F$ be a function, where $\F \in \set {\R, \C}$.

Let $f$ be continuous on the real interval $\hointr 0 \to$, except possibly for some finite number of discontinuities of the first kind in every finite subinterval of $\hointr 0 \to$.




Then $f$ is said to be of exponential order, denoted $f \in \mathcal E$, if and only if it is of exponential order $a$ for some $a > 0$.