Research Article
Convergence of Generalized Quasi-Nonexpansive Mappings in Hyperbolic Space
Table 3
Table shows the behavior of different iterations of Example
2 toward fixed point along the y-component (as the values of both components are same).
| Steps | Mann | Ishikawa | Agarwal | Noor | Abbas |
| 0 | 0.1 | 0.1 | 0.1 | 0.1 | 0.1 | 1 | 0.378251457847309 | 0.349865685358071 | 0.469116310149775 | 0.353488188856970 | 0.448059476721477 | 2 | 0.438734562339734 | 0.420761766649737 | 0.448858705072300 | 0.423665139911046 | 0.450145841140597 | 3 | 0.448471847181185 | 0.441497041994946 | 0.450275252488784 | 0.442926124783628 | 0.450182937304719 | 4 | 0.449930314735026 | 0.447614030619777 | 0.450177267430227 | 0.448198567436677 | 0.450183599267090 | 5 | 0.450146188219705 | 0.449423071779080 | 0.450184050424117 | 0.449640755996101 | 0.450183611080230 | 6 | 0.450178083528851 | 0.449958470681449 | 0.450183580897748 | 0.449640755996101 | 0.450183611291043 | 7 | 0.450182794815804 | 0.450116960188063 | 0.450183613399004 | 0.450035161737148 | 0.450183611294805 | 8 | 0.450183490697381 | 0.450163879470642 | 0.450183611149223 | 0.450143016673408 | 0.450183611294872 | 9 | 0.450183593482115 | 0.450177769732867 | 0.450183611304956 | 0.450172510434213 | 0.450183611294874 | 10 | 0.450183608663854 | 0.450181881911416 | 0.450183611294176 | 0.450180575695778 | 0.450183611294874 | 11 | 0.450183610906261 | 0.450183099313956 | 0.450183611294922 | 0.450182781191706 | 0.450183611294874 | 12 | 0.450183611237474 | 0.450183459723810 | 0.450183611294870 | 0.450183384298093 | 0.450183611294874 | 13 | 0.450183611286395 | 0.450183566422521 | 0.450183611294874 | 0.450183549221219 | 0.450183611294874 | 14 | 0.450183611293621 | 0.450183598010491 | 0.450183611294874 | 0.450183594320454 | 0.450183611294874 | 15 | 0.450183611294689 | 0.450183607362055 | 0.450183611294874 | 0.450183606653115 | 0.450183611294874 | 16 | 0.450183611294846 | 0.450183610130569 | 0.450183611294874 | 0.450183610025556 | 0.450183611294874 | 17 | 0.450183611294870 | 0.450183610950183 | 0.450183611294874 | 0.450183610947771 | 0.450183611294874 | 18 | 0.450183611294873 | 0.450183611192829 | 0.450183611294874 | 0.450183611199956 | 0.450183611294874 | 19 | 0.450183611294874 | 0.450183611264663 | 0.450183611294874 | 0.450183611199956 | 0.450183611294874 | 20 | 0.450183611294874 | 0.450183611285930 | 0.450183611294874 | 0.450183611268918 | 0.450183611294874 | 21 | 0.450183611294874 | 0.450183611292226 | 0.450183611294874 | 0.450183611287776 | 0.450183611294874 | 22 | 0.450183611294874 | 0.450183611294090 | 0.450183611294874 | 0.450183611292933 | 0.450183611294874 | 23 | 0.450183611294874 | 0.450183611294642 | 0.450183611294874 | 0.450183611294343 | 0.450183611294874 | 24 | 0.450183611294874 | 0.450183611294805 | 0.450183611294874 | 0.450183611294728 | 0.450183611294874 | 25 | 0.450183611294874 | 0.450183611294853 | 0.450183611294874 | 0.450183611294834 | 0.450183611294874 | 26 | 0.450183611294874 | 0.450183611294868 | 0.450183611294874 | 0.450183611294863 | 0.450183611294874 | 27 | 0.450183611294874 | 0.450183611294872 | 0.450183611294874 | 0.450183611294871 | 0.450183611294874 | 28 | 0.450183611294874 | 0.450183611294873 | 0.450183611294874 | 0.450183611294873 | 0.450183611294874 | 29 | 0.450183611294874 | 0.450183611294873 | 0.450183611294874 | 0.450183611294873 | 0.450183611294874 | 30 | 0.450183611294874 | 0.450183611294874 | 0.450183611294874 | 0.450183611294874 | 0.450183611294874 |
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