I want to show
$$\lim_{R\to\infty}\int_\gamma f(z)\ \text{d}z=\lim_{R\to\infty}\int_\gamma\frac{e^{-ikz}}{\cosh(z)}\text{d}z = 0$$
for
$$ \gamma(t) = R + it \qquad t \in [0, \pi] $$
and some $k \in \mathbb{R}$
My idea is to prove that
$$ \lim_{R\to\infty}\left|\int_\gamma\frac{e^{-ikz}}{\cosh(z)}\text{d}z\right|\le\lim_{R\to\infty}\int_\gamma\frac{|e^{-ikz}|}{|\cosh(z)|}\text{d}z\le 0 $$
What I already got is
$$ |e^{-ikz}| \le |e^{ky}| \le |e^{k\pi}| \le C $$
My attempt to estimate a useful lower bound of $|\cosh(z)|$ wasn't successful.
Do I have to evaluate the integral more properly to find the upper bound of $f(z)$ or is there another solution?
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1 Answer
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Note that using the addition angle formula
$$\cosh(R+it)=\cosh(R)\cos(t)+i\sinh(R)\sin(t)$$
we have $|\cosh(R+it)|=\sqrt{\cosh^2(R)\cos^2(t)+\sinh^2(R)\sin^2(t)}$.
Then, using the identities $\cosh^2(z)-\sinh^2(z)=1$ and $\cos^2(z)+\sin^2(z)=1$, we can write
$$\begin{align} \left|\int_\gamma \frac{e^{-ikz}}{\cosh(z)}\,dz\right|&=\left|\int_0^\pi \frac{e^{-ik(R+it)}}{\cosh(R+it)}\,i\,dt\right|\\\\ &\le \int_0^\pi \frac{e^{kt}}{|\cosh(R)\cos(t)+i\sinh(R)\sin(t)|}\,dt\\\\ &=\int_0^\pi \frac{e^{kt}}{\sqrt{\cosh^2(R)-\sin^2(t)}}\,dt\\\\ &\le \frac{\pi e^{k\pi}}{\sqrt{\cosh^2(R)-1}}\\\\ &\to 0\,\,\text{as}\,\,R\to \infty \end{align}$$
And we are done!
answered Jan 11, 2018 at 20:58