| [1] |
Al-Baali, Descent property and global convergence of the Fletcher-Reeves method with inexact line search, IMA J. Numer. Anal., 5 (1985), pp. 121{124}. · Zbl 0578.65063 |
| [2] |
N. Andrei, New hybrid conjugate gradient algorithms for unconstrained optimization, Encyclopedia of Optimization (2009) 2560- 2571. |
| [3] |
N. Andrei, A hybrid conjugate gradient algorithm for unconstrained optimization as a convex combination of Hestenes-Stiefel and Dai-Yuan, Studies in Informatics and Control, 17, 1 (2008) 5570. |
| [4] |
N. Andrei, Another hybrid conjugate gradient algorithm for unconstrained optimization, Numerical Algorithms, 47, 2 (2008) 143156. · Zbl 1141.65041 |
| [5] |
S. Djordjevic, New Hybrid Conjugate Gradient Method as a Convex Combination of FR and PRP Methods, Filomat(2016), 3083-3100. · Zbl 1474.90437 |
| [6] |
Note sur la convergence de m´ethodes de directions conjugu´ees, Revue franc¸aise dinformatique et de recherche oprationnelle. S´erie rouge, tome 3, n0 R1 (1969), 35-43. · Zbl 0174.48001 |
| [7] |
Y.H. Dai, Y. Yuan, Convergence properties of the Fletcher-Reeves method, IMA J. Numer. Anal., 16 (1996) 155-164. · Zbl 0851.65049 |
| [8] |
N. Andrei, Scaled conjugate gradient algorithms for unconstrained optimization, Computational Optimization and Applications, 38, 3 (2007) 401-416. · Zbl 1168.90608 |
| [9] |
D. Touati-Ahmed, C. Storey, Efficient hybrid conjugate gradient techniques, J. Optim. Theory Appl., 64 (1990) 379-397. · Zbl 0666.90063 |
| [10] |
P.Wolfe, Convergence conditions for ascent methods. II: Some corrections, SIAM Review, 11 (1969) 226-235. · Zbl 0177.20603 |
| [11] |
R. Fletcher, C. Reeves, Function minimization by conjugate gradients, Comput. J., 7 (1964) 149-154 · Zbl 0132.11701 |
