Compared to their continuous-time counterparts (those that take a continuous-valued independent time variable $t$), discrete-time sinusoidal signals have two unique characteristics. It is possible for them to alias , and they are not always periodic .
Aliasing of discrete-time sinusoids
One might think that if two different discrete-time sinuoids have different frequencies, that they would be different signals. Such is the case with continuous-time sinusoids, but not always for the discrete-time version. Consider two discrete-time sinuoids $x_1[n]$ and $x_2[n]$ with different frequencies, $\omega$ and $\omega+2\pi$: $x_1[n]=e^{j(\omega n+\phi)}$ $x_2[n]=e^{j((\omega+2\pi)n +\phi}$ We can then simplify the expression of $x_2[n]$, using the fact that $e^{j2\pi}=1$ to arrive at this surprising conclusion: $x_2[n]=e^{j((\omega+2\pi)n +\phi}=e^{j(\omega n+2\pi n +\phi)}=e^{j(\omega n +\phi)}e^{j2\pi n}=e^{j(\omega n +\phi)}(1)^n=e^{j(\omega n +\phi)}=x_1[n]$So $x_1[n]$ and $x_2[n]$ had different frequencies, yet they are identical! You can see this plotted out with $\omega=\frac{\pi}{6}$ below:So only frequencies along a continuous interval of length $2\pi$ on the real number are distinct from each other. For this reason, when we deal with discrete-time frequencies we consider only those along the interval $0\leq\omega\lt2\pi$ or $-\pi\lt\omega\leq\pi$, as any other frequency aliases back to an identical signal with a frequency in that range. Within these ranges, frequencies close to $0$ (or $2\pi, depending on the range used) are low frequencies--their sinusoids do not oscillate very quickly-- and frequencies close to $\pi$ (or $-\pi, depending on the range) are high frequencies:
Periodicity of discrete-time sinusoids
Recall that a signal $x[n]$ is defined to be periodic if there exists some integer $N$ for which $x[n+N]=x[n]~,~\forall n$. Suppose we have a complex sinusoid with a frequency $\omega=2\pi\frac{k}{N}$, where $k$ and $N$ are integers. This just means that $\omega$ is a fraction of $2\pi$. It turns out that this signal is periodic, with period $N$:$\begin{align*} x[n]&=e^{j(2\pi\frac{k}{N} n+ \phi)}\\ x[n+N]&=e^{j(2\pi\frac{k}{N} (n+N) + \phi)} \\&=e^{j(2\pi\frac{k}{N} n + 2\pi\frac{k}{N} N + \phi)}\\&=e^{j(2\pi\frac{k}{N} n + \phi)} e^{j(2\pi\frac{k}{N} N)}\\&=e^{j(2\pi\frac{k}{N} n + \phi)}e^{j(2\pi\frac{k}{N}N)}\\&=e^{j(2\pi\frac{k}{N} n + \phi)}(e^{j(2\pi k)})\\&=x[n] \end{align*}$Here is a plot of a sinusoid with frequency $2\pi\frac{3}{16}$. You will note that it has a period of $N=16$:In contrast, consider sinusoids whose frequencies are
not fractions of $\pi$:
$\begin{align*}x[n]&=e^{j(\omega n+ \phi)}\\
x[n+N]&=e^{j(\omega (n+N) + \phi)} \\&=e^{j(\omega n + \omega N + \phi)}\\&=e^{j(\omega n + \phi)} e^{j(\omega N)}\\&=e^{j(\omega n + \phi)}e^{j(\omega N)}\\&\neq x[n],\textrm{unless } \omega N=2\pi k \rightarrow \omega=2\pi\frac{k}{N}\end{align*}$
So we see that discrete-time sinusoids are periodic if, and only if, their frequencies are fractions of $2\pi$. Consider the example of a non-periodic sinusoid below. It definitely oscillates, and at first it appears to be periodic, but look carefully and you will see that it is not, unlike the one from the figure above.