On the solution of a class of inverse evolution problems by a Bellman-Adomian method

The close relation between HermItIan wavelets transforms and the dlffuslon equation 1s used to derive a one-parameter family of distributed sources as solutions to the inverse diffusion problem m RN x R-The class of solutions 1s interpreted m terms of energetically dominant events m the wavelet repr

## Abstract In this paper the factorization method from inverse scattering theory and impedance tomography is extended to a class of general elliptic differential equations in divergence form. The inverse problem is to determine the interface ∂Ω of an interior change of the material parameters from

A particular PDE having nonlinear advection, diffusion and reaction subject to initial and boundary conditions is investigated by using an algorithm based on Adomian decomposition method. This algorithm uses initial and boundary conditions simultaneously and effectively for constructing the solution