Why do we need the quantization for lattice vibration?

The classical oscillator does not have discrete levels, its energy is $$E=frac{p^2}{2m} + frac{momega^2x^2}{2},$$ which can take any value greater or equal to zero. On the other hand, for a quantum oscillator only the energy values $$E_n = hbaromegaleft(n+frac{1}{2}right)$$ are possible.

Whether to use classical or quantum description for a physical system is not a matter of our choice - rather we choose the description that is more consistent with the real world. Quantum mechanics describes the real world physical phenomena better than classical one, although in some problems quantum effects may be neglected and the classical description suffice. In case of phonons quantum description is necessary, e.g., to obtain the expressions for specific heat that are consistent with experiments. On the other hand, sound propagation in solids is mostly described using classical elasticity.

Finally, in case of wave phenomena, like electromagnetic wave or phonons, the formalism called second quantization, which is in fact first quantization!

Update
In the reference (added later to the question) the wave numbers $k_n$ and the corresponding frequencies $omega_n=c_{ph}k_n$ refer to different oscillators. In other words, the oscillations are possible only with these frequencies, but the energy of oscillations at any particular frequency can still be arbitrary (if the oscillators are classical). While such "quantization" due to the number of atoms and the finite size of a system is typical for wave phenomena, it is not really a quantum effect, but simply a buzz word used instead of saying discreteness.

One should note however that mathematically the quantum quantization and discreteness of spectrum arise in the same way, since in quantum description particles are described by waves, whose spectra may become discrete when the motion is constrained.