An explicit stability estimate for an ill-posed Cauchy problem for the wave equation

## Abstract In this paper we shall define an inverse problem for the Helmholtz equation with imaginary part of the wave number being positive. The Cauchy data are known on the boundary of the half plane, but it is not known where the half axis, lying vertically in the upper half plane, is situated.

We design an order-optimal stopping rule for the \(\nu\)-method for solving ill-posed problems with noisy data. The construction of the \(\nu\)-method is based on a sequence of Jacobi polynomials, and the stopping rule is based on a sequence of related Christoffel functions. The motivation for our s

We present our results in this paper in two parts. In the first part, we consider k 2 2 the Cauchy problem for the axially symmetric equation Ѩ u q Ѩ u q Ѩ u s 0 . with entire Cauchy data given on an initial plane see Eq. 2.1 . We solve the Cauchy problem and obtain its solutions in two cases, dep