If an ion at position $\mathbfR$ displaces by $\mathbfu(\mathbfR, t)$ due to a phonon, the potential $V(\mathbfr)$ experienced by an electron at position $\mathbfr$ changes. The total potential is:
The title of this chapter, across various editions and syllabi, is almost universally This is the engine of resistivity, the origin of superconductivity, and the key to understanding temperature-dependent band gaps. This article dissects the core principles, mathematical machinery, and physical consequences of Chapter 13. 1. The Fundamental Coupling: Why Electrons and Ions Cannot Ignore Each Other Up to Chapter 12, the Born-Oppenheimer approximation treated nuclei as fixed classical potentials. Chapter 13 systematically destroys that approximation. The central idea is simple yet profound: ions are not static; they vibrate. An electron feels a different potential depending on the instantaneous positions of those ions. ziman principles of the theory of solids 13
$$H_e-ph = \sum_\mathbfk, \mathbfk', \lambda M_\lambda(\mathbfq) , c_\mathbfk'^\dagger c_\mathbfk (a_\mathbfq\lambda + a_-\mathbfq\lambda^\dagger)$$ If an ion at position $\mathbfR$ displaces by
The interaction Hamiltonian $H_e-ph$ does not just scatter electrons; it can create an effective attraction between two electrons. How? One electron emits a virtual phonon; a second electron absorbs it. This process is second-order in perturbation theory. The central idea is simple yet profound: ions
$$V_total(\mathbfr) = V_0(\mathbfr) + \delta V(\mathbfr, t)$$