Functional Analysis, Approximation and Computation

In this article, we prove a unique common fixed point and a coincidence point theorems using an implicit relation on weak partial metric spaces. The results presented in this paper extend and generalize several results from the existing literature.

bibitem{AP09} A. Aliouche and V. Popa, General common fixed point theorems for occasionally weakly compatible hybmappings and applications, Novi Sad J. Math. {bf 39(1)} (2009), 89-109.

bibitem{AT09} I. Altun and D. Turkoglu, Some fixed point theorems for weakly compatible mappings satisfying an implicit relation, Taiwanese J. Math. {bf 13(4)} (2009), 1291-1304.

bibitem{AD12} I. Altun and G. Durmaz, Weak partial metric spaces and some fixed point results, Appl. Gen. Topol.{bf 13(2)} (2012), 179-191.

bibitem{B22} S. Banach, Sur les operation dans les ensembles

abstraits et leur application aux equation integrals, Fund. Math.

{bf 3}(1922), 133-181.

bibitem{B12} V. Berinde, Approximating fixed points of implicit almost contractions, Hacettepe J. Math. Stat. {bf 41(1)} (2012), 93-102.

bibitem{BV12} V. Berinde and F. Vetro, Common fixed points of mappings satisfying implicit contractive conditions, Fixed Point Theory Appl. {bf 2012}, 2012:105.

bibitem{DAA13} G. Durmaz, O. Acar and I. Altun, Some fixed point results on weak partial metric spaces, Filomat {bf 27} (2013), 317-326.

bibitem{DAA14} G. Durmaz, O. Acar and I. Altun, Two general fixed point results on weak partial metric spaces, J. Nonlinear Anal. Optim. {bf 5} (2014), 27-35.

bibitem{H99} R. Heckmann, Approximations of metric spaces by partial metric spaces, Appl. Categ. Struct. {bf 7} (1999), 71-83.

bibitem{IKK02} M. Imdad, S. Kumar and M. S. Khan, Remarks on some fixed point theorems satisfying implicit relations, Radovi Math. {bf 1} (2002), 135-143.

bibitem{J86} G. Jungck, Compatible mappings and common fixed point, Intern. J. Math. Math. Sci. {bf 9} (1986), 771-779.

bibitem{M92} S. G. Matthews, Partial metric topology, Research report 2012, Dept. Computer Science, University of Warwick, 1992.

bibitem{M94} S. G. Matthews, Partial metric topology, Proceedings of the 8th summer conference on topology and its applications, Annals of the New York Academy of Sciences, {bf 728} (1994), 183-197.

bibitem{P97} V. Popa, Fixed point theorems for implicit contractive mappings, Stud. Cerc. Stiint., Ser. Mat., Univ. Bac$check{a}$u {bf 7} (1997), 127-134.

bibitem{P99} V. Popa, On some fixed point theorems for compatible mappings satisfying an implicit relation, Demonstr. Math. {bf 32(1)} (1999), 157-163.

bibitem{P05} V. Popa, A general fixed point theorem for four weakly compatible mappings satisfying an implicit relation, Filomat {bf 19} (2005), 45-51.

bibitem{PP12} V. Popa and A.-M. Patriciu, A general Fixed point theorem for pairs of weakly compatible mappings in $G$-metric spaces, J. Nonlinear Sci. Appl. {bf 5} (2012), 151-160.

bibitem{PP16} V. Popa and A.-M. Patriciu, Fixed point theorems for two pairs of mappings in partial metric spaces, Facta Univ. (NI$check{S}$), Ser. Math. Inform. {bf 31(5)} (2016), 969-980.

bibitem{PP17} V. Popa and A.-M. Patriciu, Fixed point theorem of $acute{C}$iri$acute{c}$type in weak partial metric spaces, Filomat {bf 31:11} (2017), 3203-3207.

bibitem{R77} B. E. Rhoades, Comparison of various definitions of contractive mappings, Trans. Amer. Math. Soc. {bf 226} (1977), 257-290.

bibitem{S03} M. Schellekens, A characterization of partial metrizibility: domains are quantifiable, Theoritical Computer Science, {bf 305(1-3)} (2003), 409-432.

bibitem{VV13} C. Vetro and F. Vetro, Common fixed points of mappings satisfying implicit relations in partial metric spaces, J. Nonlinear Sci. Appl. {bf 6} (2013), 152-161.

bibitem{W06} P. Waszkiewicz, Partial metrizibility of continuous posets, Mathematical Structures in Computer Science {bf 16(2)} (2006), 359-372.