Abstract
Let ,
and
be real Hilbert spaces, let
and
be two bounded linear operators. Moudafi introduced simultaneous iterative algorithms with weak convergence for the following split common fixed-point problem:
Section.Display where
and
are two firmly quasi-nonexpansive operators with nonempty fixed-point sets
and
. Note that, by taking
and
, we recover the split common fixed-point problem originally introduced by Cesnor and Segal. However, to employ Moudafi’s algorithms, one needs to know a prior norm (or at least an estimate of the norm) of the bounded linear operators. To estimate the norm of an operator is very difficult, if it is not an impossible task. In this paper, we will continue to consider the split common fixed-point problem (1) governed by the general class of quasi-nonexpansive operators. We introduce a simultaneous iterative algorithm with a way of selecting the stepsizes such that the implementation of the algorithm does not need any prior information about the operator norms. The weak convergence result of algorithm is obtained and some applied nonlinear analysis examples are stated.
Notes
1 The research was supported by the Fundamental Research Funds for the Central Universities [program number 3122013k004], it was also supported by Fundamental Research Funds for the Central Universities [project number 3122013C002].