论文信息 - Stable numerical solution of a fractional-diffusion inverse heat conduction problem

Stable numerical solution of a fractional-diffusion inverse heat conduction problem

The ill-posed problem of attempting to recover the boundary temperature and the heat flux functions from one measured transient data temperature at some interior point of a one-dimensional semi-infinite conductor when the governing linear diffusion equation is of fractional type is discussed. A simple algorithm based on space marching mollification techniques is introduced for the numerical solution of the discrete problem. Stability bounds, error estimates and numerical examples of interest are also presented.

Diego A. Murio | D. Murio

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