论文标题
关于积聚运算符的定量亚竞争能力
On quantitative metastability for accretive operators
论文作者
论文摘要
科伦巴赫(Kohlenbach)和作者提取了与均匀凸出且均匀平滑的巴拉赫空间中连续伪缩合的近似曲线相关的近似曲线的速率,其收敛归功于帝国。在本说明中,我们表明,该结果可能会扩展到Reich的原始收敛声明,涉及积聚运营商的分辨率。
Kohlenbach and the author have extracted a rate of metastability for approximate curves associated to continuous pseudocontractive self-mappings in Banach spaces which are uniformly convex and uniformly smooth, whose convergence is due to Reich. In this note, we show that this result may be extended to Reich's original convergence statement involving resolvents of accretive operators.
