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Let C be subset of a vector space, and consider a semigroup of nonlinear mappings Tt: CC, where t[0, +). The common fixed points of this semigroup can be interpreted as stationary points of a dynamic system defined by the semigroup, meaning they remain unchanged during the transformation Tt at any given time t. This paper focuses on semigroups of -nonexpansive mappings in an abstract modular space X, where is a regular convex modular. By employing recent results on the existence of such stationary points, we demonstrate that, under specific conditions, the sequence xk generated by the implicit iterative process xk+1 = ckTtk+1 (xk+1) + (1 ck) xk is -convergent to a common fixed point of the semigroup. Our findings extend existing convergence results for semigroups of operators from Banach spaces and modular function spaces to a broader class of regular modular spaces.
Wojciech M. Kozƚowski (Fri,) studied this question.