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Kuleev, V. G.; Atangulova, L. V.; Лопатин, В. В.

doi:10.1023/a:1023335922503

Cited by 2 publications

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“…Notice that in an arbitrary direction of the wavevector q 1 the matrix element ( 16) includes a term proportional to the third-order elastic modulus c111 . This modulus is one order of magnitude larger than the other third-order moduli in the majority of cubic crystals, but its sign is opposite to the sign of the initial modulus c 111 (see [22], table 1). It is responsible for the small deviation of the relaxation characteristics in cubic crystals from those calculated in the context of the isotropic medium model [12].…”

mentioning

confidence: 90%

“…The exact expression for the matrix element of the threephonon scattering processes [2,22] will only include the terms that are linear in longitudinal components of quasitransverse vibrations, while the terms proportional to quadratic combinations of (e 1 n 1 ), (e 2 n 2 ), (e 3 n 3 ) will be neglected. The error of this approximation is about 1% in Ge, InSb, GaSb and GaAs, and less than 1% in Si and diamond.…”

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confidence: 99%

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Anharmonic processes of scattering and absorption of slow quasi-transverse modes in cubic crystals with positive and negative anisotropies of second-order elastic moduli

Kuleyev

Arapova

2008

J. Phys.: Condens. Matter

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The quasi-transverse ultrasound absorption during anharmonic processes of the scattering in cubic crystals with positive (Ge, Si, diamond and InSb) and negative (KCl and NaCl) anisotropies of the second-order elastic moduli is studied. Mechanisms underlying the relaxation of the slow quasi-transverse mode by two slow (the SSS mechanism) or two fast (the SFF) modes are discussed in the long-wavelength approximation. Angular dependences of the ultrasound absorption for the SSS, SFF and Landau-Rumer relaxation mechanisms are analyzed in terms of the anisotropic continuum model. The full absorption of the slow quasi-transverse mode is determined. It is shown that the SSS and SFF relaxation mechanisms are due to the cubic anisotropy of the crystals, leading to the interaction between noncollinear phonons. Two most important cases-the wavevectors of phonons are in the cube face plane or the diagonal planes-are considered. In crystals with a considerable anisotropy of the elastic energy (Ge, Si, InSb, KCl and NaCl) the total contribution of the SSS and SFF relaxation mechanisms to the full absorption is either several times or one to two orders of magnitude larger than the contribution from the Landau-Rumer mechanism depending on the direction. Much of the dominance of the former relaxation mechanisms over the Landau-Rumer mechanism is explained by second-order elastic moduli.

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confidence: 90%

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confidence: 99%

Anharmonic processes of scattering and absorption of slow quasi-transverse modes in cubic crystals with positive and negative anisotropies of second-order elastic moduli

Kuleyev

Arapova

2008

J. Phys.: Condens. Matter

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“…Therefore, the phonon relaxation rates calculated in the framework of this model provide a reliable basis for the interpretation of experimental data on the ultrasonic absorption and phonon transport in cubic crystals. It should be noted that the anisotropy of the spectrum and the presence of degeneracy points in vibrational modes of transverse phonons lead to a new relaxation mechanism of the phonons in some anharmonic processes of scattering in cubic crystals as compared to isotropic media [19][20][21]. For example, the Herring mechanism [19], in which the fusion of a longitudinal phonon with a slow (ST) transverse phonon generates a fast (FT) transverse phonon, becomes possible.…”

Section: Introductionmentioning

confidence: 99%

“…For example, the Herring mechanism [19], in which the fusion of a longitudinal phonon with a slow (ST) transverse phonon generates a fast (FT) transverse phonon, becomes possible. A new mechanism of transverse phonon relaxation in cubic crystals, according to which the fusion of a transverse phonon (slow or fast) with a slow transverse phonon generates a fast transverse phonon, has been investigated in [21]. This mechanism is similar to the Herring relaxation mechanism for longitudinal phonons [19] and can be referred to as the Herring mechanism for transverse phonons.…”

Section: Introductionmentioning

confidence: 99%

“…These mechanisms are absent in isotropic media, because the transverse modes in them are degenerate. A new relaxation mechanism of transverse phonons [21], like the Herring mechanism for longitudinal phonons [19], leads to a dependence of the longwavelength ultrasound absorption on the wavevector q and temperature T in the form α TTT ∼ α LTT ∼ q 2 T 3 . As a rule, this dependence appears to be less effective in the long-wavelength limit than dependences of the Landau-Rumer type: α λ TTT ∼ qT 4 .…”

Section: Introductionmentioning

confidence: 99%

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Interaction of collinear and noncollinear phonons in anharmonic scattering processes and their role in ultrasound absorption of fast quasi-transverse modes in cubic crystals

Kuleyev¹,

Kuleyev²,

Arapova³

2010

J. Phys.: Condens. Matter

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The absorption of fast quasi-transverse modes during anharmonic scattering processes in cubic crystals with positive (Ge, Si, diamond and InSb) or negative (KCl and CaF(2)) anisotropies of the second-order elastic moduli is studied. Mechanisms underlying the relaxation of the fast quasi-transverse mode by two fast (the FFF mechanism) or two slow (the FSS) modes are discussed in the long-wavelength approximation. Angular dependences of the ultrasound absorption for the FFF, FSS and Landau-Rumer relaxation mechanisms are analyzed in terms of the anisotropic continuum model. The full absorption of the fast quasi-transverse mode is determined. The problem of the scattering of collinear and noncollinear phonons in cubic crystals and their role in the ultrasound absorption of the fast quasi-transverse modes is considered. It is shown that the FFF and FSS relaxation mechanisms are due to the cubic anisotropy of the crystals, leading to the interaction between noncollinear phonons. In crystals with a considerable anisotropy of the elastic energy (InSb and KCl), the total contribution of the FFF and FSS relaxation mechanisms to the full absorption is one to two orders of magnitude larger than the contribution from the Landau-Rumer mechanism, depending on the direction. Much of the dominance of the former relaxation mechanisms over the Landau-Rumer mechanism is explained by second-order elastic moduli. The role of the Landau-Rumer mechanism in ultrasound absorption may be considerable in cubic crystals with a smaller anisotropy of the elastic energy. It is demonstrated that when anharmonic scattering processes play the dominant role, the inclusion of one of the relaxation mechanisms (the Landau-Rumer mechanism or the FFF or FSS mechanisms of relaxation) is insufficient for the quantitative description of the anisotropy of the full absorption of the fast quasi-transverse modes in cubic crystals.

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Cited by 2 publications

References 1 publication

Anharmonic processes of scattering and absorption of slow quasi-transverse modes in cubic crystals with positive and negative anisotropies of second-order elastic moduli

Anharmonic processes of scattering and absorption of slow quasi-transverse modes in cubic crystals with positive and negative anisotropies of second-order elastic moduli

Interaction of collinear and noncollinear phonons in anharmonic scattering processes and their role in ultrasound absorption of fast quasi-transverse modes in cubic crystals

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