AbstractThe backward problems of parabolic equations are of interest in the study of both mathematics and engineering.
In this paper, we consider a backward problem for the one-dimensional heat conduction equation with the measurements on a discrete set.
The uniqueness for recovering the initial value is proved by the analytic continuation method.
We discretize this inverse problem by a finite element method to deduce a severely ill-conditioned linear system of algebra equations.
In order to overcome the ill-posedness, we apply the discrete Tikhonov regularization with the generalized cross validation rule to obtain a stable numerical approximation to the initial value.
Numerical results for three examples are provided to show the effect of the measurement data.