Let (X, ->) be an L-space, G : X x X -> X and f : X -> X be two operators. Let f(G) : X -> X be defined by f(G)(x) := G(x, f(x)). If the operator G satisfies the following conditions.
(A(1)) G(x, x) = x, for all x is an element of X;
(A(2)) G(x, y) = x double right arrow y = x,
then we call f(G) admissible perturbation of f.
We introduce some iterative algorithms in terms of admissible perturbations. We suppose that these algorithms are convergent.
In this paper we study the impact of this hypothesis on the theory of fixed point equations Gronwall lemmas (when (X, ->, <=) is an ordered L-space), data dependence, stability and shadowing property (when (X, d) is a metric space). Some open problems are presented.

• 出版日期2012