Universal Journal of Computational Mathematics(CEASE PUBLICATION) Vol. 1(2), pp. 19 - 23
DOI: 10.13189/ujcmj.2013.010201
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Triple Coincidence Point Theorems for Multi-Valued Maps in Partially Ordered Metric Spaces


K.P.R. Rao1, G.N.V. Kishore2,*, P.R.Sobhana Babu3
1 Department of Mathematics, Acharya Nagarjuna University,Nagarjuna Nagar, Guntur - 522 510, Andhra Pradesh, India
2 Department of Mathematics, Baba Institute of Technology and Sciences,P.M.Palem, Madhurawada Visakhapatnam - 530048, Andhra Pradesh, India
3 Department of Mathematics, Ramachandra College of Engineering, Vatluru(V), Eluru-534007, West Godavari Dist., Andhra Pradesh, India

ABSTRACT

In this paper we prove a triple coincidence point theorem for multi - valued and single-valued mappings in a partially ordered metric space based on the concepts of [5]. Also we give an example which supports our main result. Our result generalizes several results relating to coupled fixed point theorems.

KEYWORDS
Triple fixed point, complete space, w-compatible, set-valued mapping, Δ-Symmetric Property

Cite This Paper in IEEE or APA Citation Styles
(a). IEEE Format:
[1] K.P.R. Rao , G.N.V. Kishore , P.R.Sobhana Babu , "Triple Coincidence Point Theorems for Multi-Valued Maps in Partially Ordered Metric Spaces," Universal Journal of Computational Mathematics(CEASE PUBLICATION), Vol. 1, No. 2, pp. 19 - 23, 2013. DOI: 10.13189/ujcmj.2013.010201.

(b). APA Format:
K.P.R. Rao , G.N.V. Kishore , P.R.Sobhana Babu (2013). Triple Coincidence Point Theorems for Multi-Valued Maps in Partially Ordered Metric Spaces. Universal Journal of Computational Mathematics(CEASE PUBLICATION), 1(2), 19 - 23. DOI: 10.13189/ujcmj.2013.010201.