"NL - Nizozemsko" . . "I, P(GAP101/11/0288)" . . . "RIV/61388998:_____/13:00396734!RIV14-GA0-61388998" . "Implicit and explicit secular equations for Rayleigh waves in two-dimensional anisotropic media"@en . . "This paper is concerned with the derivation of implicit and explicit secular equations for Rayleigh waves polarized in a plane of symmetry of an anisotropic linear elastic medium. It has been confirmed, in accord with Ting\u2019s paper [2], that the Rayleigh waves propagate with no geometric dispersion. Numerical evaluations of both the implicit and explicit equations give the same values of Rayleigh wave velocities. In the case of orthotropic material (thin composites) it has been found that Rayleigh wave velocity depends significantly (as with bulk waves) on the directions of principal material axes. For the same material model the analytical solutions, based on implicit and explicit secular equations, were compared against the finite element and experimental data that had been published by Cerv et al. [4] in 2010. It emerged that the theory was in accordance with the experiment." . "[2C0038CA74FC]" . "Rayleigh waves; secular equations; anisotropic materials; composites"@en . "Implicit and explicit secular equations for Rayleigh waves in two-dimensional anisotropic media" . "RIV/61388998:_____/13:00396734" . "50" . "Implicit and explicit secular equations for Rayleigh waves in two-dimensional anisotropic media"@en . "0165-2125" . "This paper is concerned with the derivation of implicit and explicit secular equations for Rayleigh waves polarized in a plane of symmetry of an anisotropic linear elastic medium. It has been confirmed, in accord with Ting\u2019s paper [2], that the Rayleigh waves propagate with no geometric dispersion. Numerical evaluations of both the implicit and explicit equations give the same values of Rayleigh wave velocities. In the case of orthotropic material (thin composites) it has been found that Rayleigh wave velocity depends significantly (as with bulk waves) on the directions of principal material axes. For the same material model the analytical solutions, based on implicit and explicit secular equations, were compared against the finite element and experimental data that had been published by Cerv et al. [4] in 2010. It emerged that the theory was in accordance with the experiment."@en . "Ple\u0161ek, Ji\u0159\u00ED" . . "000325835900005" . "Implicit and explicit secular equations for Rayleigh waves in two-dimensional anisotropic media" . . . . . . "\u010Cerv, Jan" . . . . "10.1016/j.wavemoti.2013.04.011" . . "2"^^ . . . . . "79214" . "Wave Motion" . "13"^^ . . "7" . "2"^^ .