Iterative solutions for zeros of multivalued accretive operators

## Abstract Two iterative schemes are designed to approach zeros of __m__–accretive operators in Banach spaces. The first one is a kind of contractive iteration process involving with the resolvent and the second one is an averaged iteration process of the identity and the resolvent. Strong converg

Let E be a real q-uniformly smooth Banach space and A : E ª 2 E be an 5 5 m-accretive operator which satisfies a linear growth condition of the form Ax F Ž 5 5. c 1 q x for some constant c ) 0 and for all x g E. It is proved that if two real Ä 4 Ä 4 Ä 4 sequences and satisfy appropriate conditions,

Let X be a uniformly smooth and uniformly convex Banach space and T : D T Ž . Ž . ; X ª X be an m-accretive operator with the domain D T and the range R T . For any given f g X, we prove that the Mann and Ishikawa type iterative sequences with errors converge strongly to the unique solution of the