A new iterative method for solving the coefficient inverse problem of the wave equation

A numerical method for a nonlinear inversion problem for the 2D wave equation with a potential is discussed. In order to avoid the ill-posedness, we substitute a coupled system of one-way wave equations for the original wave equation. An iterative algorithm is constructed to improve the accuracy of

The paper presents a new relatively simple yet very effective method to obtain an approximate solution of the direct and inverse problems for two-dimensional wave equation (two space variables and time). Such a equation describes, for example, the vibration of a membrane. To obtain an approximate so

We present a new iterative Chebyshev spectral method for solving the elliptic equation \(\nabla \cdot(\sigma \nabla u)=f\). We rewrite the equation in the form of a Poisson's equation \(\nabla^{2} u=(f-\nabla u \cdot \nabla \sigma) / \sigma\). In each iteration we compute the right-hand side terms f

## Abstract This article is concerned with the shape reconstruction for the inviscid fluid governed by the Euler equations. By formulating the domain derivative of the Euler equations and applying a regularized Gauss‐Newton iterative algorithm, the numerical examples are given for recovering the sh