‎In this manuscript‎, ‎the concept of generalized $(\eta‎, ‎\chi‎, ‎p)$ contractive mapping for two maps in the framework of w-distance is introduced and some fixed point results are established, which extend recent results of Lakzian and Rho
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‎In this manuscript‎, ‎the concept of generalized $(\eta‎, ‎\chi‎, ‎p)$ contractive mapping for two maps in the framework of w-distance is introduced and some fixed point results are established, which extend recent results of Lakzian and Rhoades [5] and many existing results in the literature‎. ‎In addition‎, ‎to validate the novelty of our findings‎, ‎we give an illustrative example‎, ‎which yields the main result‎. ‎Moreover‎, ‎as an application‎, ‎we employ the achieved result to earn the existence criteria of the‎ ‎solution of a type of non-linear Fredholm integral equation‎.
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