Common Fixed Point Results in Fuzzy Menger Space

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Common Fixed Point Results in Fuzzy Menger Space

Author Affiliations

¹Department of Mathematics, Govt. Model Science College, Jabalpur MP, INDIA
²Govt. Science College, Pandhuqna, MP, INDIA
³Department of Mathematics, Govt. Model Science College, Jabalpur MP, INDIA

Res. J. Mathematical & Statistical Sci., Volume 1, Issue (5), Pages 1-5, June,12 (2013)

Abstract

In this paper we establish fixed point theorems in Fuzzy Menger space for weak commutative and weak compatible which satisfying implicit relation.

References

Menger K., Statistical Matrices, Proceedings of the National academy of sciences of the United states of America, 28, 535-537 (1942)
Bharucha Ried A.T., Fixed point theorems in Probabilistic analysis, Bull. Amer. Math. Soc, 82, 611-617 (1976)
Google Scholar
Boscan Gh., On some fixed point theorems in Probabilistic metric spaces, Math.balkanica, 4, 67-70 (1974)
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Chang S., Fixed points theorems of mappings on Probabilistic metric spaces with applications, Scientia Sinica SeriesA, 25,114-115 (1983)
Google Scholar
Dedeic R. and Sarapa N., Fixed point theorems for sequence of mappings on Menger spaces, Math. Japonica, 34(4), 535-539(1988)
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Hadzic O., On the (ε, λ)-topology of LPC-Spaces, Glasnik Mat; 13(33), 293-297 (1978)
Hadzic O., Some theorems on the fixed points in probabilistic metric and random normed spaces, Boll. Un. Mat. Ital;13(5)18, 1-11 (1981)
Google Scholar
Schweizer B. and Sklar A., Statistical metrices spaces, pacific Journal of Mathematics, 10, 313- 334 (1960)
Sessa S., On weak commutativity conditions of mapping in fixed point consideration, Publ. Inst. Math. Beograd, 32(46),149-153 (1982)
Google Scholar
Jungck G. and Rhodes B.E., Fixed point for set valued functions without continuity, Indian J. Pure. Appl. Math., 29(3), 977-983 (1998)
Google Scholar
Shrivastav Rajesh, Patel Vivek and Dhagat Vanita Ben, Fixed point theorem in fuzzy menger spaces satisfying occasionallyweakly compatible mappings, International J. of Math. Sci. & Engg. Appls., 6(VI), 243-250 (2012)
Mishra S.N., Common fixed points of compatible mappings in PM-Spaces, Math. Japonica, 36(2), 283-289 (1991)
Google Scholar
Kamran T., Coincidence and fixed points for hybrid strict contraction, J. Math. Anal. Appl., 299(1), 235-241 (2004)
Google Scholar
Shrivastav Rajesh, Nath Satyendra, Patel Vivek and Ben Dhagat Vanita, Weak and semi compatible maps in fuzzyprobabilistic metric space using implicit relation, International journal of mathematical archive, 2(6) 958-963 (2011)
Google Scholar

[ref1] Menger K., Statistical Matrices, Proceedings of the National academy of sciences of the United states of America, 28, 535-537 (1942)

[ref2] Bharucha Ried A.T., Fixed point theorems in Probabilistic analysis, Bull. Amer. Math. Soc, 82, 611-617 (1976)
Google Scholar

[ref3] Boscan Gh., On some fixed point theorems in Probabilistic metric spaces, Math.balkanica, 4, 67-70 (1974)
Google Scholar

[ref4] Chang S., Fixed points theorems of mappings on Probabilistic metric spaces with applications, Scientia Sinica SeriesA, 25,114-115 (1983)
Google Scholar

[ref5] Dedeic R. and Sarapa N., Fixed point theorems for sequence of mappings on Menger spaces, Math. Japonica, 34(4), 535-539(1988)
Google Scholar

[ref6] Hadzic O., On the (ε, λ)-topology of LPC-Spaces, Glasnik Mat; 13(33), 293-297 (1978)

[ref7] Hadzic O., Some theorems on the fixed points in probabilistic metric and random normed spaces, Boll. Un. Mat. Ital;13(5)18, 1-11 (1981)
Google Scholar

[ref8] Schweizer B. and Sklar A., Statistical metrices spaces, pacific Journal of Mathematics, 10, 313- 334 (1960)

[ref9] Sessa S., On weak commutativity conditions of mapping in fixed point consideration, Publ. Inst. Math. Beograd, 32(46),149-153 (1982)
Google Scholar

[ref10] Jungck G. and Rhodes B.E., Fixed point for set valued functions without continuity, Indian J. Pure. Appl. Math., 29(3), 977-983 (1998)
Google Scholar

[ref11] Shrivastav Rajesh, Patel Vivek and Dhagat Vanita Ben, Fixed point theorem in fuzzy menger spaces satisfying occasionallyweakly compatible mappings, International J. of Math. Sci. & Engg. Appls., 6(VI), 243-250 (2012)

[ref12] Mishra S.N., Common fixed points of compatible mappings in PM-Spaces, Math. Japonica, 36(2), 283-289 (1991)
Google Scholar

[ref13] Kamran T., Coincidence and fixed points for hybrid strict contraction, J. Math. Anal. Appl., 299(1), 235-241 (2004)
Google Scholar

[ref14] Shrivastav Rajesh, Nath Satyendra, Patel Vivek and Ben Dhagat Vanita, Weak and semi compatible maps in fuzzyprobabilistic metric space using implicit relation, International journal of mathematical archive, 2(6) 958-963 (2011)
Google Scholar