|
References:
[1] Amini-Harandi, A: Metric-like spaces, partial metric spaces and fixed points. Fixed Point Theory Appl. 2012, 204 (2012)
[2] Aage, CT, Salunke, JN: The results on fixed points in dislocated and dislocated quasi-metric space. Appl. Math. Sci.2(59), 2941-2948 (2008)
[3] Aage, CT, Salunke, JN: Some results of fixed point theorem in dislocated quasi-metric spaces. Bull. Marathwada Math. Soc. 9, 1-5 (2008)
[4] B. Samet, C. Vetro, P. Vetro, Fixed point theorems for contractive
type mappings, Nonlinear Analysis, 75 (2012) 2154-2165.
[5] Daheriya, RD, Jain, R, Ughade, M: Some fixed point theorem for expansive type mapping in dislocated metric space. ISRN Math. Anal. 2012, Article ID 376832 (2012)
[7] Eldered, AA, Veeramani, P: Convergence and existence for best proximity points. J. Math. Anal. Appl. 323, 1001-1006 (2006)
[8] Eldered, AA, Veeramani, P: Proximal pointwise contraction. Topol. Appl. 156, 2942-2948 (2009)
[9] Hitzler, P, Seda, AK: Dislocated topologies. J. Electr. Eng. 51(12), 3-7 (2000)
[10] Kirk, WA, Srinavasan, PS, Veeramani, P: Fixed points for mapping satisfying cyclical contractive conditions. Fixed Point Theory 4, 79-89 (2003) [7] Sarma, IR, Kumari, PS: On dislocated metric spaces. Int. J. Math. Arch. 3(1), 72-77 (2012)
[11] Karapınar, E: Fixed point theory for cyclic weak contraction. Appl. Math. Lett. 24, 822-825 (2011)
[12] E. Karap_nar, P. Salimi, Dislocated metric space to metric spaces with some fixed point theorems, Fixed Point Theory and Appl.,(2013), 2013:222
[13] Karapınar, E, Erhan, IM, Ulus, AY: Fixed point theorem for cyclic maps on partial metric spaces. Appl. Math. Inf. Sci. 6(1), 239-244 (2012)
[14] Karapınar, E, Sadarangani, K: Fixed point theory for cyclic ( ) contractions. Fixed Point Theory Appl. 2011, 69 (2011)
[15] Karpagam, S, Agrawal, S: Best proximity points theorems for cyclic Meir-Keeler contraction maps. Nonlinear Anal. 74, 1040-1046 (2011)
[16] Karpagam, S, Agrawal, S: Existence of best proximity points of p-cyclic contractions. Fixed Point Theory 13(1), 99-105 (2012)
[17] Matthews S.G. , Partial Metric Topology, Annals new york academy of sciences, Ann. New York Aced. Sci., 728 (1994) 183{197.
[18] Mongkolkeha, C, Kumam, P: Best proximity point theorems for generalized cyclic contractions in ordered metric spaces. J. Optim. Theory Appl. (2012). doi:10.1007/s10957-012-9991-y
[19] Nashine, HK, Sintunavarat, W, Kumam, P: Cyclic generalized contractions and fixed point results with applications to integral equation. Fixed Point Theory Appl. 2012, 217 (2012)
[20] Pacurar, M, Rus, IA: Fixed point theory for cyclic -contractions. Nonlinear Anal. 72(3-4), 1181-1187 (2010)
[21] Petru,sel, G: Cyclic representations and periodic points. Stud. Univ. Babe,s-Bolyai, Math. 50, 107-112 (2005)
[22] Rus, IA: Cyclic representations and fixed points. Ann. Tiberiu Popoviciu Semin. Funct. Equ. Approx. Convexity 3, 171-178 (2005) [9] Zeyada, FM, Hassan, GH, Ahmed, MA: A generalization of a fixed point theorem due to Hitzler and Seda in dislocated quasi-metric spaces. Arab. J. Sci. Eng., Sect. A 31(1), 111-114 (2005)
[23] Shrivastava, R, Ansari, ZK, Sharma, M: Some results on fixed points in dislocated and dislocated quasi-metric spaces. J. Adv. Stud. Topol. 3(1), 25-31 (2012)
[24] Sintunavarat, W, Kumam, P: Common fixed point theorem for cyclic generalized multi-valued contraction mappings. Appl. Math. Lett. 25(11), 1849-1855 (2012)
[25] Zoto, K, Hoxha, E, Isufati, A: Some new results in dislocated and dislocated quasi-metric spaces. Appl. Math. Sci. 6(71), 3519-3526 (2012)
[26] Zoto, K, Hoxha, E: Fixed point theorems for -contractive type mappings in dislocated quasi-metric spaces. Int. Math. Forum 7(51), 2503-2508 (2012)
[27] Zoto, K, Hoxha, E: Fixed point theorems in dislocated and dislocated quasi-metric spaces. J. Adv. Stud. Topol. 3(4), 119-124 (2012)
|
