A New Type of Ill-Posed and Inverse Problems for Parabolic Equations
arxiv(2024)
Abstract
The time dependent experimental data are always collected at discrete grids
with respect to the time t. The step size h of such a grid is always separated
from zero by a certain positive number. The same is true for all computations,
which are always done on discrete grids with their grid step sizes being not
too small. These applied considerations prompt us to introduce a new type of
Ill-Posed Problems and Coefficient Inverse Problems (CIP)for parabolic
equations. In these problems the t-derivatives of corresponding parabolic
operators are written in finite differences with the grid step size being
separated from zero. We call this the "t-finite difference framework" (TFD). We
address three long standing open questions within the TFD framework. Finally, a
numerical method is developed for the CIP of monitoring epidemics. The global
convergence of this method is proven.
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