A fixed point theorem for orbitally continuous functions.
DOI:
https://doi.org/10.22199/S07160917.1991.0017.00006Keywords:
Orbitalmente, OperadoresAbstract
A fixed point theorem for orbitally continuous functions is presented which extends well known results.
References
BOYO, D.W. and WONG, J.S.W. On nonlinear contractions, Proc. Amer. Math. Soc., 20, (1969), 458-464.
CIRIC, Lj. Fixed and periodic points of almost contractive operators, Mathematica Balcanica, 3, (1973), 33-39.
ISTRACESCU, C. Fixed point theory, Academic Press (1984).
JAGGI, D.S. Fixed point theorems for orbitally continuous functions 11, Indian J. Math. 19(2), (1977), 113-119.
KHAN, M.S. Common fixed point theorems for multivalued mapping3, Pacific J. Math. 95, (1981), 337-347.
CIRIC, Lj. Fixed and periodic points of almost contractive operators, Mathematica Balcanica, 3, (1973), 33-39.
ISTRACESCU, C. Fixed point theory, Academic Press (1984).
JAGGI, D.S. Fixed point theorems for orbitally continuous functions 11, Indian J. Math. 19(2), (1977), 113-119.
KHAN, M.S. Common fixed point theorems for multivalued mapping3, Pacific J. Math. 95, (1981), 337-347.
Published
2018-04-02
How to Cite
[1]
I. K. Argyros, “A fixed point theorem for orbitally continuous functions.”, Proyecciones (Antofagasta, On line), vol. 10, no. 17, pp. 53-57, Apr. 2018.
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