Quantitative translations for viscosity approximation methods in hyperbolic spaces

In the setting of hyperbolic spaces, we show that convergence Browder-type sequences and Halpern iterations respectively entail their viscosity version with a Rakotch map. We also hybrid Krasnoselskii-Mann iteration follows from Browder type sequence. Our results follow proof-theoretic techniques (proof mining). From an analysis theorems due to T. Suzuki, extract transformation rates for original into corresponding versions. these transformations can be applied earlier quantitative studies iterations. theorem H.-K. Xu, N. Altwaijry S. Chebbi, obtain similar results. Finally, in uniformly convex Banach spaces study strong notion accretive operator Brezis Sibony uniform modulus uniqueness property being zero point. this context, it is possible Cauchy (and hence versions).