Approximation of the zeros of m-accretive operators

It is shown that a zero of an m-aceretive operator \(T: D(T) \subset X \rightarrow 2^{x}\), in a general Banach space \(X\), can be approximated via methods of lines for associated evolution equations. Results of Browder for (single-valued) locally defined continuous accretive operators \(T\) in spa

## 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

## Abstract Strong convergence of two iterative schemes is proved to approach some zero of multivalued accretive operators in a Banach space. The first one is a regularization method for Rockafellar's proximal point algorithm of the resolvent and the second one is a kind of Halpern type iteration p