From kinetic to collective behavior in thermal transport on semiconductors and semiconductor nanostructures

Tomás, Carla de; Cantarero, A.; Lopeandía, A. F.; Álvarez, F. X.

doi:10.1063/1.4871672

Cited by 71 publications

(80 citation statements)

References 41 publications

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“…38 and derived by Alvarez and Jou [43]: . We used Σ 2 in place of Σ in the above expression as it provided a better interpolation → 0 at low-T (Fig.…”

Section: Discussionmentioning

confidence: 99%

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Ballistic magnon heat conduction and possible Poiseuille flow in the helimagnetic insulator Cu2OSeO3

et al. 2017

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We report on the observation of magnon thermal conductivity κm ∼ 70 W/mK near 5 K in the helimagnetic insulator Cu2OSeO3, exceeding that measured in any other ferromagnet by almost two orders of magnitude. Ballistic, boundary-limited transport for both magnons and phonons is established below 1 K, and Poiseuille flow of magnons is proposed to explain a magnon mean-free path substantially exceeding the specimen width for the least defective specimens in the range 2K < T < 10 K. These observations establish Cu2OSeO3 as a model system for studying longwavelength magnon dynamics.

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“…38 and derived by Alvarez and Jou [43]: . We used Σ 2 in place of Σ in the above expression as it provided a better interpolation → 0 at low-T (Fig.…”

Section: Discussionmentioning

confidence: 99%

“…Interpolation is controlled by "switching factors" [34,38] related to the ratio ℓ N /ℓ R (Appendix F and Fig. 8).…”

Section: B Ballistic Lattice and Magnon Thermal Conductivities Distimentioning

confidence: 99%

Ballistic magnon heat conduction and possible Poiseuille flow in the helimagnetic insulator Cu2OSeO3

et al. 2017

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“…To further interpret this transition from ballistic to normal behavior, a recent proposed kinetic-collective model [16] based on different phonon-phonon scattering physics might be worthwhile, from which a wide range of temperature-and size-dependent thermal conductivity can be predicted quite well [16][17][18]. However, obviously such a theoretical model does not involve the effects of other nonlinear excitations, such as solitons [19] and discrete breathers (DBs) [20][21][22][23].…”

Section: Introductionmentioning

confidence: 99%

Crossover from ballistic to normal heat transport in theϕ4lattice: If nonconservation of momentum is the reason, what is the mechanism?

2017

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Anomalous (non-Fourier's) heat transport is no longer just a theoretical issue since it has been observed experimentally in a number of low-dimensional nanomaterials, such as SiGe nanowires, carbon nanotubes, and others. To understand these anomalous behaviors, exploring the microscopic origin of normal (Fourier's) heat transport is a fascinating theoretical topic. However, this issue has not yet been fully understood even for one-dimensional (1D) model chains, in spite of a great amount of thorough studies done to date. From those studies it has been widely accepted that the conservation of momentum is a key ingredient to induce anomalous heat transport, while momentumnonconserving systems usually support normal heat transport where Fourier's law is valid. But if the nonconservation of momentum is the reason, what is the underlying microscopic mechanism for the observed normal heat transport? Here we carefully revisit a typical 1D momentum-nonconserving φ 4 model and present evidence that the mobile discrete breathers or, in other words, the moving intrinsic localized modes with frequency components above the linear phonon band can be responsible for that.

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“…This failure arises because the simultaneous interaction of all phonon populations is crucial, and such collective behaviour 4,10 can lead to the emergence of composite excitations as the leading heat carriers.…”

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confidence: 99%

Phonon hydrodynamics in two-dimensional materials

et al. 2015

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The conduction of heat in two dimensions displays a wealth of fascinating phenomena of key relevance to the scientific understanding and technological applications of graphene and related materials. Here, we use density-functional perturbation theory and an exact, variational solution of the Boltzmann transport equation to study fully from first-principles phonon transport and heat conductivity in graphene, boron nitride, molybdenum disulphide and the functionalized derivatives graphane and fluorographene. In all these materials, and at variance with typical three-dimensional solids, normal processes keep dominating over Umklapp scattering well-above cryogenic conditions, extending to room temperature and more. As a result, novel regimes emerge, with Poiseuille and Ziman hydrodynamics, hitherto typically confined to ultra-low temperatures, characterizing transport at ordinary conditions. Most remarkably, several of these two-dimensional materials admit wave-like heat diffusion, with second sound present at room temperature and above in graphene, boron nitride and graphane.

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From kinetic to collective behavior in thermal transport on semiconductors and semiconductor nanostructures

Cited by 71 publications

References 41 publications

Ballistic magnon heat conduction and possible Poiseuille flow in the helimagnetic insulator Cu2OSeO3

Ballistic magnon heat conduction and possible Poiseuille flow in the helimagnetic insulator Cu2OSeO3

Crossover from ballistic to normal heat transport in theϕ4lattice: If nonconservation of momentum is the reason, what is the mechanism?

Phonon hydrodynamics in two-dimensional materials

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