Condition of source-representability and estimates for convergence rate of methods for regularization of linear equations in Banach spaces. II (Q1398524)

This is a continuation of the author's paper [\textit{M. Yu. Kokurin}, Izv. Vyssh. Uchebn. Zaved., Mat. 2001, 51-59 (2001; Zbl 1001.47008)]. The subject of the research presented in this series is an iteration sequence \(x_\alpha\) approximating the (possibly non-unique) solution \(x^*\) of the linear equation \(Ax= y\), where \(A\) is a non-invertible Banach space operator. In the present paper, the author shows that a certain ``source representability'' condition, which is sufficient for an estimate of the form \(\|x_\alpha- x^*\|\leq C\alpha^p\), is also ``close'' to necessary. For related Hilbert space results, see the book by \textit{H. W. Engl}, \textit{M. Hanke} and \textit{A. Neubauer} [``Regularization and inverse problems'' (Math. Appl. 375, Dordrecht, Kluwer Acad. Publ.) (1996; Zbl 0859.65054)].