From: Convergence comparison and stability of Jungck-Kirk-type algorithms for common fixed point problems
Number of iterations | Jungck-Kirk-Mann | Jungck-Kirk-Ishikawa | Jungck-Kirk-Noor | Jungck-Kirk-CR | Jungck-Kirk-SP | ||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
n |
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
0 | 0.8 | 0.8 | 0.8 | 0.8 | 0.8 | 0.251845 | 0.8 | 0.8 | 0.879634 | 0.8 | 0.8 | 0.750212 | 0.8 | 0.8 | 0.490599 |
1 | 0.8 | 0.8 | 0.612962 | 0.251845 | 0.251845 | 0.369233 | 0.879634 | 0.879634 | 0.700824 | 0.750212 | 0.750212 | 0.44583 | 0.490599 | 0.490599 | 0.495894 |
2 | 0.612962 | 0.612962 | 0.511105 | 0.369233 | 0.369233 | 0.410876 | 0.700824 | 0.700824 | 0.517399 | 0.44583 | 0.44583 | 0.412812 | 0.495894 | 0.495894 | 0.460743 |
3 | 0.511105 | 0.511105 | 0.458584 | 0.410876 | 0.410876 | 0.412387 | 0.517399 | 0.517399 | 0.440228 | 0.412812 | 0.412812 | 0.412391 | 0.460743 | 0.460743 | 0.431079 |
4 | 0.458584 | 0.458584 | 0.43267 | 0.412387 | 0.412387 | 0.412391 | 0.440228 | 0.440228 | 0.418184 | 0.412391 | 0.412391 | 0.412391 | 0.431079 | 0.431079 | 0.417575 |
5 | 0.43267 | 0.43267 | 0.420663 | 0.412391 | 0.412391 | 0.412391 | 0.418184 | 0.418184 | 0.413388 | 0.412391 | 0.412391 | 0.412391 | 0.417575 | 0.417575 | 0.413452 |
6 | 0.420663 | 0.420663 | 0.415511 | 0.412391 | 0.412391 | 0.412391 | 0.413388 | 0.413388 | 0.412536 | 0.412391 | 0.412391 | 0.412391 | 0.413452 | 0.413452 | 0.412555 |
7 | 0.415511 | 0.415511 | 0.413478 | 0.412391 | 0.412391 | 0.412391 | 0.412536 | 0.412536 | 0.412409 | 0.412391 | 0.412391 | 0.412391 | 0.412555 | 0.412555 | 0.412411 |
8 | 0.413478 | 0.413478 | 0.412741 | 0.412391 | 0.412391 | 0.412391 | 0.412409 | 0.412409 | 0.412393 | 0.412391 | 0.412391 | 0.412391 | 0.412411 | 0.412411 | 0.412393 |
9 | 0.412741 | 0.412741 | 0.412496 | 0.412391 | 0.412391 | 0.412391 | 0.412393 | 0.412393 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412393 | 0.412393 | 0.412391 |
10 | 0.412496 | 0.412496 | 0.41242 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 |
11 | 0.41242 | 0.41242 | 0.412399 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 |
12 | 0.412399 | 0.412399 | 0.412393 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 |
13 | 0.412393 | 0.412393 | 0.412392 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 |
14 | 0.412392 | 0.412392 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 |
15 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 |
16 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 | 0.412391 |