We calculate the lattice-driven in-plane $\left({\kappa }_{\parallel }\right)$ and out-of-plane $\left({\kappa }_{\perp }\right)$ thermal conductivities of ${\mathrm{Bi}}_2{\mathrm{Se}}_3$ bulk, and of films of different thicknesses, using the Boltzmann equation with phonon scattering times obtained from anharmonic third order density functional perturbation theory. We compare our results for the lattice component of the thermal conductivity with published data for ${\kappa }_{\parallel }$ on bulk samples and with our room-temperature thermoreflectance measurements of ${\kappa }_{\perp }$ on films of thickness ($L$) ranging from 18 nm to 191 nm, where the lattice component has been extracted via the Wiedemann-Franz law. Ab initio theoretical calculations on bulk samples, including an effective model to account for finite sample thickness and defect scattering, compare favorably both for the bulk case (from literature) and thin films (new measurements). In the low-$T$ limit the theoretical in-plane lattice thermal conductivity of bulk ${\mathrm{Bi}}_2{\mathrm{Se}}_3$ agrees with previous measurements by assuming the occurrence of intercalated ${\mathrm{Bi}}_2$ layer defects. The measured thermal conductivity monotonically decreases by reducing $L$; its value is ${\kappa }_{\perp }\approx 0.39\pm 0.08\mathrm{W}/\mathrm{m}\mathrm{K}$ for $L=18\mathrm{nm}$ and ${\kappa }_{\perp }=0.68\pm 0.14\mathrm{W}/\mathrm{m}\mathrm{K}$ for $L=191\mathrm{nm}$. We show that the decrease of room-temperature ${\kappa }_{\perp }$ in ${\mathrm{Bi}}_2{\mathrm{Se}}_3$ thin films as a function of sample thickness can be explained by the incoherent scattering of out-of-plane momentum phonons with the film surface. Our work outlines the crucial role of sample thinning in reducing the out-of-plane thermal conductivity.

• Received 13 December 2019
• Revised 22 March 2020
• Accepted 27 April 2020

DOI:https://doi.org/10.1103/PhysRevB.101.205419