摘要
本文将简正波理论推广到大振幅声场,计及声场内的非线性效应。这涉及非线性偏微分方程的固有振动解的问题。简正波具有驻波性质,基本已反映在一阶近似解中。高阶近似解只是非线性引致参量的局部变化或修正,并不影响分布。根据这个概念解决了过去的数学困难,求得了大振幅简正函数,为线性商正函数及其谐频项,此外还有常数项,代表辐射压,与经典辐射压值作了比较。
Conception of normal modes of vibration is generalized to finite-amplitude sound fields inenclosures, taking into acount of the nonlinear effects. This includes the solution the wave equation inthe from of nonlinear partial differential equations, for the natural vibrations in the closed space. Indoing sos the standing wave nature of the solution is emphasized. The first order solution is taken asthe basic solution of the problem, and all the higher order solutions but the modification or correctionat various points on basic waveform due to the nonlinearity and do not change the standing wave natureof the solution. In this way, the finite-amplitude normal function is derived for the first time, containingthe basic solution, the same normal function as in linear acoustics, and its harmonics. And besides,time-independent terms exist in the complete solution, representing the radiation pressure in the finiteamplitude sound field
出处
《声学学报》
EI
CSCD
北大核心
1996年第3期193-203,共11页
Acta Acustica
基金
国家自然科学基金
