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• [1] H. Aydi, E. Karapınar, D. Zhang, On common fixed points in the context of Brianciari metric spaces, Results Math, vol.71, 73-92, (2017).
• [2] I. A. Bakhtin, The contraction mapping principle in quasimetric spaces, Functional Analysis, vol. 30, 26–37, (1989).
• [3] A. Branciari, A fixed point theorem of Banach-Caccioppoli type on a class of generalized matric spaces, Publ. Math. Debrecen, vol.7(1-2), 31-37, (2000).
• [4] V. Berinde, Contrac¸tii Generalizate ¸si Aplica¸tii, Editura Cub Press, vol. 2 , Baia Mare, Romania, (1997).
• [5] V. Berinde, Sequences of operators and fixed points in quasi-metric spaces, Mathematica, vol. 41, 23-27, (1997). 1
• [6] V. Berinde, Generalized contractions in quasimetric spaces, in Seminar on Fixed Point Theory, vol. 93 of Preprint 3, Babe¸s-Bolyai University, Cluj-Napoca, Romania, 3-9, (1993).
• [7] S. Czerwik, Contraction mappings in b-metric spaces, Acta Math. Inform. Univ. Ostrav., vol. 1, 5–11, (1993).
• [8] R. George, S. Radenovic, K.P. Reshma, S. Shukla, Rectangular b-metric spaces and contraction principle, J. Nonlinear Sci. Appl., vol. 8, 1005–1013, (2015).
• [9] E. Karapınar, B, Samet, Generalized α-ψ contractive type mappings and related fixed point theorems with applications, Abstract and Applied Analysis, vol.2012, Article ID:793486, (2012).
• [10] W. A. Kirk, N. Shahzad, Generalized metrics and Caristis theorem. Fixed Point Theory Appl. 2013, Article ID 129 (2013).
• [11] I. A. Rus., Generalized contractions and applications, Cluj University Press, Cluj-Napoca, Romania, (2001). 1, 1.8
• [12] B. Samet, C. Vetro, P. Vetro, Fixed point theorems for α-ψ-contractive type mappings, Nonlinear Analysis, vol.75, 2154-2165, (2012).