AIMS Mathematics (Sep 2022)
Regularization of a final value problem for a linear and nonlinear biharmonic equation with observed data in $ L^{q} $ space
Abstract
In this work, we focus on the final value problem of an inverse problem for both linear and nonlinear biharmonic equations. The aim of this study is to provide a regularized method for the bi-harmonic equation, once the observed data are obtained at a terminal time in $ L^{q}(\Omega) $. We obtain an approximated solution using the Fourier series truncation method and the terminal input data in $ L^{q}(\Omega) $ for $ q \ne 2 $. In comparision with previous studies, the most highlight of this study is the error between the exact and regularized solutions to be estimated in $ L^{q}(\Omega) $; wherein an embedding between $ L^{q}(\Omega) $ and Hilbert scale spaces $ \mathcal{H}^{\rho}(\Omega) $ is applied.
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