Fixed points of enriched contraction and almost enriched CRR contraction maps with rational expressions and convergence of fixed points

G. V. R. Babu; Palla Mounıka

Research Article

Year 2023, Volume: 5 Issue: 1, 5 - 16, 18.07.2023

G. V. R. Babu Palla Mounıka

Abstract

References

V. Berinde, Approximating fixed points of enriched nonexpansive mappings by Krasnoselskij iteration in Hilbert spaces, Carpathian J. Math. 35(3), (2019), 293-304.
V. Berinde, and M. P˘acurar, Fixed point theorems for enriched Ciric-Reich-Rus contractions in Banach spaces and convex metric spaces, Carpathian J. Math., 37(2), (2021), 173-184.
B. K. Dass, and S. Gupta, An extension of Banach contraction principle through rational expression, Indian J. Pure and Appl. Math., 6 (1975), 1455-1458.
D. S. Jaggi, Some unique fixed point theorems, Indian J. Pure and Appl. Math., 8(2), (1977), 223-230.
M. Aslantas, H. Sahin and D. Turkoglu, Some Caristi type fixed point theorems, The Journal of Analysis, 29(1), (2021), 89-103.
M. Aslantas, H. Sahin and U. Sadullah, Some generalizations for mixed multivalued mappings, Applied General Topology, 23(1), (2022), 169-178.

Fixed points of enriched contraction and almost enriched CRR contraction maps with rational expressions and convergence of fixed points

Year 2023, Volume: 5 Issue: 1, 5 - 16, 18.07.2023

G. V. R. Babu Palla Mounıka

Abstract

We define enriched Jaggi contraction map, enriched Dass and Gupta contraction map and almost (k, a, b, \lambda)-enriched CRR contraction maps with \lambda=\frac{1}{k+1} in Banach spaces and prove the existence and uniqueness of fixed points of these maps. Further, we show that the sequence of fixed points of
the corresponding enriched contraction maps converges to the fixed point of the uniform limit operator of these enriched contraction maps.

Keywords

enriched Jaggi contraction map, enriched Dass and Gupta contraction map, Fixed point., Almost (k, a, b, \lambda)-enriched contraction maps

References

V. Berinde, Approximating fixed points of enriched nonexpansive mappings by Krasnoselskij iteration in Hilbert spaces, Carpathian J. Math. 35(3), (2019), 293-304.
V. Berinde, and M. P˘acurar, Fixed point theorems for enriched Ciric-Reich-Rus contractions in Banach spaces and convex metric spaces, Carpathian J. Math., 37(2), (2021), 173-184.
B. K. Dass, and S. Gupta, An extension of Banach contraction principle through rational expression, Indian J. Pure and Appl. Math., 6 (1975), 1455-1458.
D. S. Jaggi, Some unique fixed point theorems, Indian J. Pure and Appl. Math., 8(2), (1977), 223-230.
M. Aslantas, H. Sahin and D. Turkoglu, Some Caristi type fixed point theorems, The Journal of Analysis, 29(1), (2021), 89-103.
M. Aslantas, H. Sahin and U. Sadullah, Some generalizations for mixed multivalued mappings, Applied General Topology, 23(1), (2022), 169-178.

There are 6 citations in total.

Details

Primary Language	English
Subjects	Software Engineering (Other)
Journal Section	Articles
Authors	G. V. R. Babu 0000-0002-6272-2645 Palla Mounıka 0000-0002-1920-3612
Early Pub Date	July 17, 2023
Publication Date	July 18, 2023
Acceptance Date	July 7, 2023
Published in Issue	Year 2023 Volume: 5 Issue: 1

Cite

Download Cover Image

Article Files

Full Text

The published articles in PIMS are licensed under a Creative Commons Attribution-NonCommercial 4.0 International License.