Strong convergence of approximation fixed points for nonexpansive nonself-mapping (Q2469043)

Convergence theorems for two viscosity type fixed point methods, the first one an implicit ``path'' process defined by \[ x_t=tf(x_t)+(1-t) T x_t \] and the second one an explicit Halpern type iteration process of the form \[ x_{n+1}=\alpha_n f(x_n)+(1-\alpha_n)T x_n,\quad n\geq 0, \] which are used to approximate the fixed points of the nonexpansive mapping \(T\), are given.