- Caristi type fixed point theorems using Szaz principle in quasi-metric spaces, by M. AAMRI, K. CHAIRA, S. LAZAIZ and EL-M. MARHRANI, pp. 179–188.
- Attractive points of monotone further generalized hybrid mappings, by MUJAHID ABBAS, HIRA IQBAL and SAFEER HUSSAIN KHAN, pp. 189–198.
- Fixed point theorems and convergence theorems for some monotone generalized nonexpansive mappings, by M. R. ALFURAIDAN and M. A. KHAMSI, pp. 199–204.
- Fixed point results for single valued and set valued P-contractions and application to second order boundary value problems, by ISHAK ALTUN, HATICE ASLAN HANCER and ALI ERDURAN, pp. 205–214.
- A probabilistic Meir-Keeler type fixed point theorem which characterizes metric completeness, by RAVINDRA K. BISHT, pp. 215–222.
- Uniqueness of solutions for a fractional thermostat model, by J. CABALLERO, J. HARJANI and K. SADARANGANI, pp. 223–228.
- A strong convergence theorem for maximal monotone operators in Banach spaces with applications, by C. E. CHIDUME, G. S. DE SOUZA, O. M. ROMANUS and U. V. NNYABA, pp. 229–240.
- On the geometry of b-distances and the fixed points of mappings, by MITROFAN M. CHOBAN, pp. 241–257.
- On Caristi’s fixed point theorem in metric spaces with a graph, by NANTAPORN CHUENSUPANTHARAT and DHANANJAY GOPAL, pp. 259–268.
- Strong convergence of Picard and Mann iterations for strongly demicontractive multi-valued mappings, by PACHARA JAILOKA, VASILE BERINDE and SUTHEP SUANTAI, pp. 269–276.
- Fixed points results in modular vector spaces with applications to quantum operations and Markov operators, by MOHAMED AMINE KHAMSI, POOM KUMAM and UMAR BATSARI YUSUF, pp. 277–286.
- Iterating nonlinear contractive mappings in Banach spaces, by ZORAN D. MITROVIC, STOJAN RADENOVIC, SIMEON REICH and ALEXANDER J. ZASLAVSKI, pp. 287–294.
- Frum-Ketkov operators which are weakly Picard, by ADRIAN PETRUSEL, IOAN A. RUS and MARCEL-ADRIAN SERBAN, pp. 295–302.
- On (ψ,φ)2- contractive maps, by RAKESH TIWARI, MOHAMMAD SAEED KHAN, SHOBHA RANI and VLADIMIR RAKOCEVIC, pp. 303–312.
- Modified two-step extragradient method for solving the pseudomonotone equilibrium programming in a real Hilbert space, by PASAKORN YORDSORN, POOM KUMAM and HABIB UR REHMAN, pp. 313–330.
- A Stackelberg-population competition model via variational inequalities and fixed points, by YUE-TIAN ZHAN, XUE-SONG LI and NAN-JING HUANG, pp. 331–339.