Yikan Liu, Zhidong Zhang
Published 2017-04-13Version 1
In this article, we consider the reconstruction of $\rho(t)$ in the (time-fractional) diffusion equation $(\partial_t^\alpha-\triangle)u(x,t)=\rho(t)g(x)$ ($0<\alpha \le 1$) by the observation at a single point $x_0$. We are mainly concerned with the situation of $x_0 \notin$ supp g, which is practically important but has not been well investigated in literature. Assuming the finite sign changes of $\rho$ and an extra observation interval, we establish the multiple logarithmic stability for the problem based on a reverse convolution inequality and a lower estimate for positive solutions. Meanwhile, we develop a fixed point iteration for the numerical reconstruction and prove its convergence. The performance of the proposed method is illustrated by several numerical examples.
Numerical methods for reconstruction of source term of heat equation from the final overdetermination
Determination of convection terms and quasi-linearities appearing in diffusion equations
On the scattering for the $\bar{\partial}$- equation and reconstruction of convection terms
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