THERMAL SCIENCE
International Scientific Journal
SOME KANNAN TYPE FIXED POINT RESULTS IN RECTANGULAR SOFT METRIC SPACE AND AN APPLICATION OF FIXED POINT FOR THERMAL SCIENCE PROBLEM
ABSTRACT
The intention of current study to survey Kannan type mappings for rectangular soft metric space. Some Kannan type results are obtained by using rectangular soft metric and an application for thermal science problem is presented.
KEYWORDS
PAPER SUBMITTED: 2018-11-02
PAPER REVISED: 2018-11-20
PAPER ACCEPTED: 2019-01-01
PUBLISHED ONLINE: 2019-03-09
THERMAL SCIENCE YEAR
2019, VOLUME
23, ISSUE
Supplement 1, PAGES [S215 - S225]
- Molodtsov D., Soft Set Theory-First Result, Comput. Math. Appl., 37 (1999), pp. 19-31
- Maji P. K, Biswas R. and Roy A. R., Soft Set Theory, Comput. Math. Appl., 45 (2003), pp. 555-562
- Aras Ç.G., Sönmez A., Çakallı H., On Soft Mappings, ArXiv, Computers & Mathematics with Applications, 60 (2013), 05/2013,9
- Aras Ç. G.G., Poşul H., On Some New Operations in Probabilistic Soft Set Theory, European Journal of Pure and Applied Mathematics, 9 (2016), 3,pp. 333-339
- Shabir M., Naz M., On soft topological spaces, Computers & Mathematics with Applications, 61 (2011), 7, pp. 1786-1799
- Zorlutuna İ., and Çakır H., On Continuity of Soft Mappings, Appl. Math. Inf. Sci. 9 (2015), 1, pp. 403-409
- Bildik N., Bakır Y., Mutlu A., The New Modified Ishikawa Iteration Method for the Approximate Solution of Different Types of Differantial Equations, Fixed Point Theory and Applications, 52 (2013), pp. 1-29.
- Gülyaz S., İnci M.E., Existence of Solutions of Integral Equations via Fixed Point Theorems, Journal of Inequalities and Applications, 138 (2014), pp. 1-15
- Qiu Y., Solving A Class of Boundary Value Problems by LSQR, Thermal Science, 21 (2017), 4, pp. 1719-1724
- Bayram M., Hatipoğlu V.F., Alkan S., Das S.E., A Solution Method for Integro- Differential Equations of Conformable Fractional Derivative, Thermal Science, 22 (2018), Suppl. 1, pp. S7-S14
- Bayram M., Büyüköz G.O., Partal T., Parameter Estimation in A Black-Scholes Model, Thermal Science, 22 (2018), Suppl. 1, pp. S117-S122
- Das S., Samanta S.K., Soft Metric, Annals of Fuzzy Mathematics and Informatics, 6 (2013), 1, pp. 77-94
- Hosseinzadeh H., Fixed Point Theorems on Soft Metric Spaces, Journal of Fixed Point Theory and Applications, 19 (2017) 2, pp 1625-1647
- Branciari A., A Fixed Point Theorem of Banach-Caccioppoli Type on a Class of Generalized Metric Spaces, Publ. Math. Debrecen, 57 (2000), pp. 31-37
- Mutlu A., Yolcu N., Mutlu B., Fixed Point Theorems in Partially Ordered Rectangular Metric Spaces, British Journal of Mathematics and Computer Science, 15 (2016), 2, pp.1-9
- Öztunç S., Mutlu A., Aslan S., Soft Fixed Point Theorems for Rectangular Soft Metric Spaces, 2. International Students Science Conference, 4-5 May 2018, İzmir/Turkey, Abstract Book, pp.102
- Öztunç S., Mutlu A., Aslan S., Soft Fixed Point Theorems for Kannan Type Mappings by Using Rectangular Soft Metric, International Conference on Mathematics:An Istanbul Meeting for World Mathematicians, 3-6 July 2018, İstanbul /Turkey, Abstract Book, pp. 334
- Kannan R., Some results on fixed point, Bull. Cal. Math. Soc., 60 (1968), pp. 71-76
- Kannan R., Some results on fixed point II, Amer. Math. Monthly, 76 (1969), pp. 405-408
- Banach, S.: Sur les operations dans les ensembles abstraits et leur application aux equations integrales. Fund Math. 3 (1922), pp.133-181
