一维波动方程反问题求解的正则化方法

THE REGULARIZATION METHODS FOR SOLVING INVERSE PROBLEM OF ONE-DIMENSIONAL WAVE EQUATION

摘要: 讨论了一维波动方程u_{tt_{-∂_{x_{(μ(x)u_{x_{)=0在一般的初、边值条件和附加条件下系数μ(x)的求解方法.把反问题归结为一不适定的非线性积分方程组,利用正则化方法克服了反问题的不适定性.}}}}}}

Abstract: Under the general initial-boundary-value condition and additional condition, the methods for solving problem of one-dimensional wave equation is discussed. The inverse problem is reduced to an ill-posed non-linear integral system. Tikhonov's regularization method overcomes the difficulty of inverse problem and has a good numerical stability. The Numerical results show that the method is feasible and effective.