Triple fixed point theorems via alpha-series in partially ordered metric spaces
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Date
2014
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Springeropen
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Abstract
This manuscript has two aims: first we extend the definitions of compatibility and weakly reciprocally continuity, for a trivariate mapping F and a self-mapping g akin to a compatible mapping as introduced by Choudhary and Kundu (Nonlinear Anal. 73:2524-2531, 2010) for a bivariate mapping F and a self-mapping g. Further, using these definitions we establish tripled coincidence and fixed point results by applying the new concept of an alpha-series for sequence of mappings, introduced by Sihag et al. (Quaest. Math. 37:1-6, 2014), in the setting of partially ordered metric spaces.
Description
Kumar, Amit/0000-0002-3919-3423; Vats, Ramesh Kumar/0000-0002-7974-5341; Tas, Kenan/0000-0001-8173-453X
Keywords
Alpha-Series, Compatible Mappings, Tripled Coincidence Point, Tripled Fixed Point, Partially Ordered Metric Space
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Vats, R.K...et al. (2014). Triple fixed point theorems via alpha-series in partially ordered metric spaces. Triple fixed point theorems via alpha-series in partially ordered metric spaces. http://dx.doi.org/10.1186/1029-242X-2014-176
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