Generalized Wellposedness and Multivalued Contraction

Arockia Prabackar; Ramasamy Uthayakumar

Generalized Wellposedness and Multivalued Contraction

Year 2014, Volume: 27 Issue: 2, 755 - 759, 27.06.2014

Abstract

In this paper, we establish the fixed point theorem for multivalued contraction. Also we prove that the generalized well posedness of the fixed point problem and continuity of multivalued contraction.

Keywords

Fixed point; Multivalued mapping; Well-posedness

References

Kannan, R Some results on fixed points, Bull. Calcutta Math.Soc. 10 71-76 1968.
Kunze, H.E., La Torre, D., and Vrscay, E.R., Contractive multifunctions, fixed point inclusions and iterated multifunction systems, J. Math. Anal. Appl. 330:159-173 2007.
Nadler, S.B., Multivalued contraction mappings, Pacific J. Math., 30:475-488 1969.
Petrusel A., Rus.I.A, and Cao. J.C, Well-posdeness in the generalized sense of the fixed point problems for multivalued operators, Taiwanese Journal of Mathematics, 11(3) 903-914 2007.
Rhoades, B, E., A comparison of various definitions of contractive mappings, Trans. Amer. Math. Soc., 226:257-290 1977. [6]. Rhoades, B.E., Contractive continuity, Contemporary Mathematics, 72 233-245 1988. definitions and
Rhoades, B.E., Fixed points and continuity for multivalued mappings, Internat. J. Math. Math. Sci., 15 15-30 1992.

Contraction

Year 2014, Volume: 27 Issue: 2, 755 - 759, 27.06.2014

Arockia Prabackar Ramasamy Uthayakumar

Abstract

References

Kannan, R Some results on fixed points, Bull. Calcutta Math.Soc. 10 71-76 1968.
Kunze, H.E., La Torre, D., and Vrscay, E.R., Contractive multifunctions, fixed point inclusions and iterated multifunction systems, J. Math. Anal. Appl. 330:159-173 2007.
Nadler, S.B., Multivalued contraction mappings, Pacific J. Math., 30:475-488 1969.
Petrusel A., Rus.I.A, and Cao. J.C, Well-posdeness in the generalized sense of the fixed point problems for multivalued operators, Taiwanese Journal of Mathematics, 11(3) 903-914 2007.
Rhoades, B, E., A comparison of various definitions of contractive mappings, Trans. Amer. Math. Soc., 226:257-290 1977. [6]. Rhoades, B.E., Contractive continuity, Contemporary Mathematics, 72 233-245 1988. definitions and
Rhoades, B.E., Fixed points and continuity for multivalued mappings, Internat. J. Math. Math. Sci., 15 15-30 1992.

There are 6 citations in total.

Details

Primary Language	English
Journal Section	Mathematics
Authors	Arockia Prabackar Ramasamy Uthayakumar
Publication Date	June 27, 2014
Published in Issue	Year 2014 Volume: 27 Issue: 2

Cite

APA	Prabackar, A., & Uthayakumar, R. (2014). Generalized Wellposedness and Multivalued Contraction. Gazi University Journal of Science, 27(2), 755-759.
AMA	Prabackar A, Uthayakumar R. Generalized Wellposedness and Multivalued Contraction. Gazi University Journal of Science. June 2014;27(2):755-759.
Chicago	Prabackar, Arockia, and Ramasamy Uthayakumar. “Generalized Wellposedness and Multivalued Contraction”. Gazi University Journal of Science 27, no. 2 (June 2014): 755-59.
EndNote	Prabackar A, Uthayakumar R (June 1, 2014) Generalized Wellposedness and Multivalued Contraction. Gazi University Journal of Science 27 2 755–759.
IEEE	A. Prabackar and R. Uthayakumar, “Generalized Wellposedness and Multivalued Contraction”, Gazi University Journal of Science, vol. 27, no. 2, pp. 755–759, 2014.
ISNAD	Prabackar, Arockia - Uthayakumar, Ramasamy. “Generalized Wellposedness and Multivalued Contraction”. Gazi University Journal of Science 27/2 (June 2014), 755-759.
JAMA	Prabackar A, Uthayakumar R. Generalized Wellposedness and Multivalued Contraction. Gazi University Journal of Science. 2014;27:755–759.
MLA	Prabackar, Arockia and Ramasamy Uthayakumar. “Generalized Wellposedness and Multivalued Contraction”. Gazi University Journal of Science, vol. 27, no. 2, 2014, pp. 755-9.
Vancouver	Prabackar A, Uthayakumar R. Generalized Wellposedness and Multivalued Contraction. Gazi University Journal of Science. 2014;27(2):755-9.