A problem with inverse time for a singularly perturbed integro-differential equation with diagonal degeneration of the kernel of high order (Q2817533)

The authors study a problem with inverse time for a singularly perturbed integro-differential equation with diagonal degeneration of the kernel of higher order. In the regularized sense of \textit{S. A. Lomov} [Introduction to the general theory of singular perturbations. (Vvedenie v obshchuyu teoriyu singulyarnykh vozmushchenij) (Russian). Moskva:``Nauka'' (1981; Zbl 0514.34049)]; \textit{S. A. Lomov} and \textit{I. S. Lomov} [Fundamentals of mathematical boundary-layer theory. Moscow: Moscow University (2011)], the authors consider an algorithm for constructing asymptotic solutions. In contrast to \textit{M. I. Imanaliev} [Methods for the solution of nonlinear inverse problems and their application. (Metody resheniya nelinejnykh obratnykh zadach i ikh prilozhenie) (Russian). Frunze: Izdatel'stvo ``Ilim'' (1977; Zbl 0448.45001)] the authors study a new case which is characterized by the absence, in the asymptotics of the solution, constituents described by the boundary function , in the differential part, of a linear operator that isolates and by the fact that the integral operator has kernel with diagonal degeneration of higher order. Theory is presented, no example is given.