A general fixed point theorem
Filomat, Tome 35 (2021) no. 12, p. 4061
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In this paper we prove a theorem which ensures the existence of a unique fixed point and is applicable to contractive type mappings as well as mappings which do not satisfy any contractive type condition. Our theorem contains the well known fixed point theorems respectively due to Banach, Kannan, Chatterjea, Ćirić and Suzuki as particular cases; and is independent of Caristi's fixed point theorem. Moreover, our theorem provides new solutions to Rhoades problem on discontinuity at the fixed point as it admits contractive mappings which are discontinuous at the fixed point. It is also shown that the weaker form of continuity employed by us is a necessary and sufficient condition for the existence of the fixed point
Classification :
47H10, 54H25
Keywords: Completeness, k-continuity, orbital continuity, weak orbital continuity
Keywords: Completeness, k-continuity, orbital continuity, weak orbital continuity
R P Pant; Vladimir Rakočević; Dhananjay Gopal; Abhijit Pant; Mangey Ram. A general fixed point theorem. Filomat, Tome 35 (2021) no. 12, p. 4061 . doi: 10.2298/FIL2112061P
@article{10_2298_FIL2112061P,
author = {R P Pant and Vladimir Rako\v{c}evi\'c and Dhananjay Gopal and Abhijit Pant and Mangey Ram},
title = {A general fixed point theorem},
journal = {Filomat},
pages = {4061 },
year = {2021},
volume = {35},
number = {12},
doi = {10.2298/FIL2112061P},
language = {en},
url = {http://geodesic.mathdoc.fr/articles/10.2298/FIL2112061P/}
}
TY - JOUR AU - R P Pant AU - Vladimir Rakočević AU - Dhananjay Gopal AU - Abhijit Pant AU - Mangey Ram TI - A general fixed point theorem JO - Filomat PY - 2021 SP - 4061 VL - 35 IS - 12 UR - http://geodesic.mathdoc.fr/articles/10.2298/FIL2112061P/ DO - 10.2298/FIL2112061P LA - en ID - 10_2298_FIL2112061P ER -
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