Integral to Infinity of Dirac Delta Function

Theorem
Let $\map \delta x$ denote the Dirac delta function.

Then:


 * $\displaystyle \int_0^{+ \infty} \map \delta x \rd x = 1$

Proof
We have that:


 * $\map \delta x = \displaystyle \lim_{\epsilon \mathop \to 0} \map {F_\epsilon} x$

where:


 * $\map {F_\epsilon} x = \begin{cases} 0 & : x < 0 \\ \dfrac 1 \epsilon & : 0 \le x \le \epsilon \\ 0 & : x > \epsilon \end{cases}$

We have that:

Then:

Hence the result.