Constructing a variational quasi‐reversibility method for a Cauchy problem for elliptic equations

Abstract: In the recent developments of regularization theory for inverse and ill‐posed problems, a variational quasi‐reversibility (QR) method has been designed to solve a class of time‐reversed quasi‐linear parabolic problems. Known as a PDE‐based approach, this method relies on adding a suitable perturbing operator to the original problem and consequently, on gaining the corresponding fine stabilized operator, which leads us to a forward‐like problem. In this work, we establish new conditional estimates for such oper… Show more

Analysis and simulation of a variational stabilization for the Helmholtz equation with noisy Cauchy data

Analysis and simulation of a variational stabilization for the Helmholtz equation with noisy Cauchy data

Quasi-reversibility methods of optimal control for ill-posed final value diffusion equations

Using a Divergence Regularization Method to Solve an Ill-Posed Cauchy Problem for the Helmholtz Equation