PHZ3400-09 Problem Set 5: Difference between revisions

Diatomic harmonic chain

1. Consider a chain of atoms with alternating masses ${\displaystyle m_{1}\;}$ and ${\displaystyle m_{2}\;}$, connected with elastic springs with constant ${\displaystyle K\;}$, moving only in the x-direction. Derive the dispersion relation ${\displaystyle \omega ^{\alpha }(k)\;}$ for this chain, with the index ${\displaystyle \alpha =1,2\;}$ coresponding to the acoustic and the optical branch, respectively.

2. Determine the speed of sound for this chain. Is there sound corresponding to the optical branch?

3. Sketch the motion of the atoms corresponding to the edge of the Brillouin zone, both for the optical and the acoustic branch.

4. Determine the Debye temperature for this system, and determine the form of the specific heat ${\displaystyle c_{V}(T)}$ in the limits of high and low temperatures.

5. Consider low temperatures (${\displaystyle T\ll T_{D}\;}$) and determine the wavelength of the most abundant phonons ${\displaystyle \lambda _{max}}$ (Hint: note the analogy with Wien's Law!)