TY - JOUR AU - Alfaqih, Waleed M. AU - Imdad, Mohammad AU - Gubran, Rqeeb AU - Khan, Idrees A. PY - 2019 DA - 2019/07/01 TI - Relation-theoretic coincidence and common fixed point results under $(F,\mathcal{R})_{g}$-contractions with an application JO - Fixed Point Theory and Applications SP - 12 VL - 2019 IS - 1 AB - In this paper, we begin with some observations on F-contractions. Thereafter, we introduce the notion of $(F,\mathcal{R})_{g}$-contractions and utilize the same to prove some coincidence and common fixed point results in the setting of metric spaces endowed with binary relations. An example is also given to exhibit the utility of our results. We also deduce some consequences in the setting of ordered metric spaces. As an application, we investigate the existence and uniqueness of a solution of integral equation of Volterra type. SN - 1687-1812 UR - https://doi.org/10.1186/s13663-019-0662-7 DO - 10.1186/s13663-019-0662-7 ID - Alfaqih2019 ER -