Second and third harmonic generation of acoustic waves in a nonlinear elastic solid in one space dimension

Fernando Lund
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Abstract

The generation of second and third harmonics by an acoustic wave propagating along one dimension in a weakly nonlinear elastic medium that is loaded harmonically in time with frequency $\omega_0$ at a single point in space, is analyzed by successive approximations starting with the linear case. It is noted that nonlinear waves have a speed of propagation that depends on their amplitude. It is also noted that both a free medium as well as a loaded medium generate higher harmonics, but that although the second harmonic of the free medium scales like the square of the linear wave, this is no longer the case when the medium is externally loaded. The shift in speed of propagation due to the nonlinearities is determined imposing that there be no resonant terms in a successive approximation solution scheme to the homogeneous problem. The result is then used to solve the inhomogeneous case also by successive approximations, up to the third order. At second order, the result is a second harmonic wave whose amplitude is modulated by a long wave, whose wavelength is inversely proportional to the shift in the speed of propagation of the linear wave due to nonlinearities. The amplitude of the long modulating wave scales like the amplitude of the linear wave to the four thirds. At short distances from the source a scaling proportional to the amplitude of the linear wave squared is recovered, as is a second harmonic amplitude that grows linearly with distance from the source and depends on the third-order elastic constant only. The third order solution is the sum of four amplitude-modulated waves, two of them oscillate with frequency $\omega_0$ and the other two, third harmonics, with $3\omega_0$. In each pair, one term scales like the amplitude of the linear wave to the five-thirds, and the other to the seven-thirds.
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非线性弹性固体在一维空间中产生声波的二次和三次谐波
从线性情况开始,通过连续近似分析了在弱非线性弹性介质中沿一维传播的声波产生二次和三次谐波的情况。我们注意到非线性波的传播速度取决于其振幅。研究还注意到,自由介质和负载介质都会产生高次谐波,但虽然自由介质的二次谐波与线性波的平方成比例,但当介质受到外部负载时就不再是这种情况了。在确定非线性引起的传播速度变化时,要求均质问题的后继近似求解方案中不存在共振项。然后利用这一结果来求解非均质问题,同样采用连续近似法,直至三阶。在二阶时,结果是一个二次谐波,其振幅受到一个长波的调制,长波的波长与线性波传播速度的移动成反比。长调制波的振幅与线性波的振幅一样,按三分之二的比例缩放。在距离声源很近的地方,会出现与线性波振幅平方成比例的缩放,以及二次谐波振幅,该振幅随距离声源的距离线性增长,仅取决于三阶弹性常数。三阶解是四个振幅调制波的总和,其中两个振荡频率为 $\omega_0$,另外两个为三次谐波,频率为 $3\omega_0$。在每对波中,一个项的振幅与线性波的振幅一样,分别为三分之二和三分之二。
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