Dirichlet Integral/Proof 3

Proof
Let:


 * $\ds \map f z = \begin{cases} \frac {e^{i z} - 1} z & z \ne 0 \\ i & z = 0\end{cases}$

We have, by Euler's Formula, for $z \in \R$:


 * $\ds \map \Im {\map f z} = \begin{cases}\frac {\sin z} z & z \ne 0 \\ 1 & z = 0\end{cases}$

So:


 * $\ds \map \Im {\int_0^\infty \dfrac {e^{i x} - 1} x \rd x} = \int_0^\infty \dfrac {\sin x} x \rd x$

Let $C_R$ be the semicircular contour of radius $R$ situated on the upper half plane, centred at the origin, traversed anti-clockwise.

Let $\Gamma_R = C_R \cup \closedint {-R} R$.

Then, by Contour Integral of Concatenation of Contours:


 * $\ds \oint_{\Gamma_R} \frac {e^{i z} - 1} z \rd z = \int_{C_R} \frac {e^{i z} - 1} z \rd z + \int_{-R}^R \frac {e^{i x} - 1} x \rd x$

From Linear Combination of Contour Integrals, we write:


 * $\ds \oint_{\Gamma_R} \frac {e^{i z} - 1} z \rd z = \int_{C_R} \frac {e^{i z} } z \rd z - \int_{C_R} \frac {\rd z} z + \int_{-R}^R \frac {e^{i x} - 1} x \rd x$

Note that $f$ is holomorphic inside our contour.

It then follows from the Cauchy-Goursat Theorem, that:


 * $\ds \oint_{\Gamma_R} \frac {e^{i z} - 1} z \rd z = 0$

We also have:

Therefore:


 * $\ds \lim_{R \mathop \to \infty} \int_{C_R} \frac {\rd z} z = \lim_{R \mathop \to \infty} \int_{-R}^R \frac {e^{i x} - 1} x \rd x = \int_{-\infty}^\infty \frac {e^{i x} - 1} x \rd x$

Evaluating the integral on the :

So:


 * $\ds \int_{-\infty}^\infty \frac {e^{i x} - 1} x \rd x = \pi i$

Taking the imaginary part:


 * $\ds \int_{-\infty}^\infty \frac {\sin x} x \rd x = \pi$

From Definite Integral of Even Function:


 * $\ds \int_{-\infty}^\infty \frac {\sin x} x \rd x = 2 \int_0^\infty \frac {\sin x} x \rd x$

Hence:


 * $\ds \int_0^\infty \frac {\sin x} x \rd x = \frac \pi 2$