Surface and interface shear horizontal acoustic waves in piezoelectric superlattices

Bousfia, A.; Boudouti, El Houssaine El; Bria, Driss; Nougaoui, A.; Djafari‐Rouhani, Bahram; Velasco, V.R.

doi:10.1063/1.373097

Cited by 20 publications

(10 citation statements)

References 27 publications

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“…According to Eqs. ( 30) and (43) 1 , the case of lowest stop band in a phononic crystal with electrically closed surface precisely fits statement (40).…”

Section: A Electrically Closed and Open Surfacessupporting

confidence: 70%

“…On these grounds, we conclude that, given the value of k, at most four SAWs within a full stop band can occur in total in the direct and reversed phononic crystal with mechanically free electrically closed surface; (40) at most four SAWs within an upper full stop band can occur in total in the direct and reversed phononic crystals with mechanically free electrically open surface.…”

Section: A Electrically Closed and Open Surfacesmentioning

confidence: 79%

“…In particular, many studies were devoted to the wave propagation in one-dimensional (1D) phononic crystals, also termed superlattices, which consist of periodically arranged layers [35]. The most numerous results were obtained for the shear horizontally polarized SAWs considered under different settings in phononic crystals of various compositions [36][37][38][39][40][41][42][43][44][45]. The sagittally polarized twopartial and the fully coupled three-partial SAWs were also widely investigated [46][47][48][49][50][51][52][53][54].…”

Section: Introductionmentioning

confidence: 99%

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Existence of surface acoustic waves in one-dimensional piezoelectric phononic crystals of general anisotropy

Darinskii¹,

Shuvalov²

2019

Phys. Rev. B

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The paper is concerned with the surface acoustic waves propagating in half-infinite one-dimensional piezoelectric phononic crystals of general anisotropy. The phononic crystal is formed of periodically repeated perfectly bonded layers, and its exterior boundary is one of the layer boundaries. The surface waves occurring in the so-called full stop bands are considered. It appears that the number of surface waves existing within a full stop band for a given layered structure is interrelated with their number in the same stop band for the phononic crystal different from the given one only due to the reversed ordering of layers within a period. A series of statements is proved on the maximum possible number of surface waves per full stop band for both these structures in total, i.e., embracing surface-wave occurrences in either one or the other structure. The analysis is performed for the electrically closed, electrically open, and electrically free types of boundary conditions on the mechanically free crystal surface, in which cases it admits a correspondingly different number of surface waves. A subsidiary instance of mechanically clamped surface is addressed as well. It is observed that the piezoelectric coupling can create new surface waves which disappear when piezoelectric coefficients turn to zero. Besides the general case of arbitrary anisotropy, we also consider two specific situations where the crystallographic symmetry allows the existence of sagittally polarized piezoactive surface waves and of shear horizontally polarized piezoactive surface waves. Numerical examples of surface-wave branches under various boundary conditions are provided.

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“…According to Eqs. ( 30) and (43) 1 , the case of lowest stop band in a phononic crystal with electrically closed surface precisely fits statement (40).…”

Section: A Electrically Closed and Open Surfacessupporting

confidence: 70%

Section: A Electrically Closed and Open Surfacesmentioning

confidence: 79%

Section: Introductionmentioning

confidence: 99%

See 1 more Smart Citation

Existence of surface acoustic waves in one-dimensional piezoelectric phononic crystals of general anisotropy

Darinskii¹,

Shuvalov²

2019

Phys. Rev. B

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“…The present paper is concerned with the interfacial acoustic waves (IAWs) localized at the internal boundary of 1D phononic bicrystals, which are formed from two perfectly bonded periodically layered or functionally graded semi-infinite elastic media of arbitrary anisotropy. Such waves have been considered in elastic as well as in piezoelectric structures [27][28][29][30][31][32]. The question which we would like to answer is: how many IAWs can exist in a stop band of the Floquet spectrum of a phononic bicrystal?…”

Section: Introductionmentioning

confidence: 99%

Interfacial acoustic waves in one-dimensional anisotropic phononic bicrystals with a symmetric unit cell

Darinskii

Shuvalov

2019

Proc. R. Soc. A.

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The paper is concerned with the interfacial acoustic waves localized at the internal boundary of two different perfectly bonded semi-infinite one-dimensional phononic crystals represented by periodically layered or functionally graded elastic structures. The unit cell is assumed symmetric relative to its midplane, whereas the constituent materials may be of arbitrary anisotropy. The issue of the maximum possible number of interfacial waves per full stop band of a phononic bicrystal is investigated. It is proved that, given a fixed tangential wavenumber, the lowest stop band admits at most one interfacial wave, while an upper stop band admits up to three interfacial waves. The results obtained for the case of generally anisotropic bicrystals are specialized for the case of a symmetric sagittal plane.

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“…Much effort has been devoted to studying the surface acoustic waves (SAWs) in 1D elastic and piezoelectric phononic crystals. The largest amount of theoretical data was obtained for shear horizontally polarized SAWs [15][16][17][18][19][20][21][22][23]. Sagittally polarized two-partial SAWs [24][25][26][27][28][29] and fully coupled three-partial SAWs [30][31][32] were also investigated.…”

Section: Introductionmentioning

confidence: 99%

Surface acoustic waves in one-dimensional piezoelectric phononic crystals with symmetric unit cell

Darinskii

Shuvalov

2019

Phys. Rev. B

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The paper studies the existence of surface acoustic waves in half-infinite one-dimensional piezoelectric phononic crystals consisting of perfectly bonded layers, which are arranged so that the unit cell is symmetric, i.e., is invariant with respect to inversion about its midplane. An example is a bilayered structure with exterior layer being half thinner than the interior layers of the same material. The layers may be generally anisotropic. The maximum possible number of surface acoustoelectric waves referred to a fixed wave number and a given full stop band is established for different types of electric boundary conditions at the mechanically free or clamped surface. In particular, it is proved that the phononic crystal-vacuum interface can support two surface waves in any full stop band. The same statement holds true in the case of a metallized surface of the crystal. This number is greater than that in a purely elastic case. In the presence of crystallographic symmetry, which decouples the sagittally and horizontally polarized surface waves, their separate admissible numbers are obtained. It is shown that the propagation along the normal to the surface is a special case, where the maximum number of surface waves is less than that along oblique directions.

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Surface and interface shear horizontal acoustic waves in piezoelectric superlattices

Cited by 20 publications

References 27 publications

Existence of surface acoustic waves in one-dimensional piezoelectric phononic crystals of general anisotropy

Existence of surface acoustic waves in one-dimensional piezoelectric phononic crystals of general anisotropy

Interfacial acoustic waves in one-dimensional anisotropic phononic bicrystals with a symmetric unit cell

Surface acoustic waves in one-dimensional piezoelectric phononic crystals with symmetric unit cell

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