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Tikhonov's Solution of Unstable Axisymmetric Initial Value Problem of Wave Propagation: Deteriorated Noisy Measurement Data  

Jang, Taek-Soo (Department of Naval Architecture and Ocean Engineering, Pusan National University)
Han, So-Lyoung (Department of Naval Architecture and Ocean Engineering, Pusan National University)
Publication Information
Journal of Ocean Engineering and Technology / v.22, no.4, 2008 , pp. 1-7 More about this Journal
Abstract
The primary aim of the paper is to solve an unstable axisymmetric initial value problem of wave propagation when given initial data that is deteriorated by noise such as measurement error. To overcome the instability of the problem, Tikhonov's regularization, known as a non-iterative numerical regularization method, is introduced to solve the problem. The L-curvecriterion is introduced to find the optimal regularization parameter for the solution. It is confirmed that fairly stable solutions are realized and that they are accurate when compared to the exact solution.
Keywords
Tikhonov regularization; unstable axisymmetric Cauchy-Poisson problem; L-curve criterion;
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