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Bibliografie 50 [92] A. Petru¸sel, I. A. Rus, Dynamics on (Pcp(X), Hd) generated by a finite family of multi-valued operators on (X, d), Math. Moravica, 5(2001), 103-110. [93] A. Petru¸sel, A. Sîntămărian, Single-valued and multi-valued Caristi type operators, Publ. Math. Debrecen 60 (2002) 167-177. [94] A. Petru¸sel, I.A. Rus, Multivalued Picard and weakly Picard operators, Fixed Point Theory and Applications (E. Llorens Fuster, J. Garcia Falset, B. Sims-Eds.), Yoko- hama Publishers (2004), 207-226. [95] A. Petru¸sel, I.A. Rus, Fixed point theory for multivalued operators on a set with two metics, Fixed Point Theory 8 (2007) 97-104. [96] A. Petru¸sel, I.A. Rus, Well-posedness of the fixed point problem for multivalued operators , Applied Analysis and Differential Equations (O. Cârjă, I. I. Vrabie eds.), World Scientific (2007), pp. 295-306. [97] A. Petru¸sel, I.A. Rus, J.-C. Yao, Well-posedness in the generalized sense of the fixed point problems, Taiwanese J. Math. 11 (2007), no. 3, 903-914. [98] A. Petrusel, I.A. Rus, M.A. S¸erban, Fixed points for operators on generalized metric spaces, CUBO 10 (2008), no. 4, 45-66. [99] A. Petru¸sel, T.A. Lazăr, Multivalued Picard operators and applications, Proc. of 11th Symposium on Symbolic and Numeric Algorithms for Scientific Computing, 26- 29 September (2009), Timi¸soara, Romania. [100] A. Petru¸sel, I.A. Rus, A theory of a metrical fixed point theorem for a multivalued operstor, Proc. of the 9-th International Conference on Fixed Point Theory and its Applications, în curs de aparit¸ie. [101] R. Precup, Discrete continuation method for boundary value problems on bounded sets in Banach spaces, J. Applied Comput. Math., 113 (2000), 267-281. [102] R. Precup, Continuation method for contractive maps on spaces endowed with vector- valued metrics, Sém. de la Théorie de la Meilleure Approx., Conv. et Optimisation, Ed. Srima, Cluj, (2001), 113-120. [103] R. Precup, Continuation results for mappings of contractive type, Sem. on Fixed Point Theory Cluj-Napoca, 2(2001), 23-40. [104] R. Precup, The continuation principle for generalized contractions, Bull. Appl. Com- put. Math. (Budapest), 96-C (2001), 367-373.
Bibliografie 51 [105] R. Precup, A Mōnch type generalization of the Eilenberg-Montgomery fixed point theorem, Sem. on Fixed Point Theory Cluj-Napoca, 1 (2000), 69-72. [106] R. Precup, Existence theorems for nonlinear problems by continuation methods, Non- linear Anal., 30 (1997), 3313-3322. [107] R. Precup, Continuation theorems for mappings of Caristy type, Studia Univ Babe¸s- Bolyai Math., 41 (1996), 101-106. [108] R. Precup, On the continuation principle for nonexpansive maps, Studia Univ. Babe¸s- Bolyai Math., 41 (1996), 85-89. [109] R.Precup, On the topological transversality principle, Nonlinear Anal.,20(1993),1-9. [110] R. Precup, On the reverse of the Krasnoselskii-Browder boundary inequality , Studia Univ. Babe¸s-Bolyai Math., 38 (1993), 41-55. [111] R. Precup, Note on an abstract continuation theorem, Studia Univ. Babe¸s-Bolyai Math., 37 (1992), 85-90. [112] R. Precup, Generalized topological transversality and existence theorems, Libertas Math., 11 (1991), 65-79. [113] R. Precup, Discrete continuation method for boundary value problems on bounded sets in Banach spaces, Fixed Point Theory with Applications in Nonlinear Analysis., J. Comput. Appl. Math., 113 (2000), 267-281. [114] R. Radovanović, Approximation of a fixed point of some nonself mappings, Math. Balkanica (N.S.) 15 (2001), no. 3-4, 213-218. [115] S. Reich, Fixed point of contractive functions, Boll. Un. Mat. Ital. 5 (1972), 26-42. [116] S. Reich, Kannan’s fixed point theorem, Boll. Un. Mat. Ital., 4 (1971), 1-11. [117] S. Reich, A fixed point theorem for locally contractive multi-valued functions, Rev. Roum. Math. Pures et Appl. 17 (1972), 569-572. [118] S. Reich, Some problems and recent results in fixed point theory, Topol. Methods in Nonlinear Funct. Anal., Contemporary Math., 21 (1983), 179-187. [119] I.A. Rus, Fixed point theorems for multivalued mappings in complete metric spaces, Math. Japon. 20 (1975) 21-24. [120] I.A. Rus, On a fixed point theorem of Maia, Studia Univ. Babe¸s-Bolyai Math. 22 (1977), 40-42.
Page 1 and 2: Universitatea ”Babe¸s-Bolyai”,
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Page 5 and 6: Introducere Teoria punctului fix pe
Page 7 and 8: demonstrate de R.S. Palais [82] în
Page 9 and 10: ative Math.& Inf. 17 (2008), No. 3,
Page 11 and 12: Pb(X) := {Y ∈ P (X)|δ(Y ) < +∞
Page 13 and 14: S¸irul aproximat¸iilor succesive
Page 15 and 16: Capitolul 2 Teoria teoremei metrice
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Page 45 and 46: Bibliografie 45 [13] G. Beer, Topol
Page 47 and 48: Bibliografie 47 [44] M. Frigon, A.
Page 49: Bibliografie 49 [75] G. Mot¸, A. P
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