Surjective Restriction of Real Exponential Function
Theorem
Let $\exp: \R \to \R$ be the exponential function:
- $\map \exp x = e^x$
Then the restriction of the codomain of $\exp$ to the strictly positive real numbers:
- $\exp: \R \to \R_{>0}$
is a surjective restriction.
Hence:
- $\exp: \R \to \R_{>0}$
is a bijection.
Proof
We have Exponential on Real Numbers is Injection.
Let $y \in \R_{> 0}$.
Then $\exists x \in \R: x = \map \ln y$
That is:
- $\exp x = y$
and so $\exp: \R \to \R_{>0}$ is a surjection.
Hence the result.
$\blacksquare$
Sources
- 1959: E.M. Patterson: Topology (2nd ed.) ... (previous) ... (next): Chapter $\text {II}$: Topological Spaces: $\S 9$. Functions: Example $2$
- 1965: J.A. Green: Sets and Groups ... (previous) ... (next): $\S 3.3$. Injective, surjective, bijective; inverse mappings: Example $48$