Abstract
We give a quantitative inelastic phonon Boltzmann equation theory of thermal transport in quantum well superlattices due to anharmonic three phonon processes. The thermal conductivity is calculated as a function of the mass ratio of the constituent atoms and of the superlattice period. We show that there is a competition between the flattening of dispersions that inhibits heat flow and reduced umklapp scattering that enhances it. Both effects must be included consistently for a quantitative treatment. We apply this theory to realistic models of $\mathrm{Si}∕\mathrm{Ge}$ based structures.
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