Fixed point theory for contractive mappings satisfying -maps in G-metric spaces.
Shatanawi, W. (2010)
Fixed Point Theory and Applications [electronic only]
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Shatanawi, W. (2010)
Fixed Point Theory and Applications [electronic only]
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Naidu, S.V.R., Rao, K.P.R., Rao, N.Srinivasa (2005)
International Journal of Mathematics and Mathematical Sciences
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Fixed Point Theory and Applications [electronic only]
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Altun, Ishak, Erduran, Ali (2011)
Fixed Point Theory and Applications [electronic only]
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Latif, Abdul, Abdou, Afrah A.N. (2009)
Fixed Point Theory and Applications [electronic only]
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Latif, Abdul, Abdou, Afrah A.N. (2009)
Fixed Point Theory and Applications [electronic only]
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Fixed Point Theory and Applications [electronic only]
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Fixed Point Theory and Applications [electronic only]
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Bapurao Chandra Dhage (1999)
Commentationes Mathematicae Universitatis Carolinae
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A fixed point theorem is proved for non-self multi-valued mappings in a metrically convex complete metric space satisfying a slightly stronger contraction condition than in Rhoades [3] and under a weaker boundary condition than in Itoh [2] and Rhoades [3].