Common fixed points of minimal contractive conditions in intuitionistic fuzzy metric space

The purpose of the present paper is to prove some new common fixed point theorems in intuitionistic fuzzy metric spaces for a pair of self-mappings satisfying minimal type contractive and continuity conditions. Our results substantially generalize and improve a multitude of relevant common fixed point theorems of the existing literature in metric as well as intuitionistic fuzzy metric spaces. We also provide an affirmative answer in the settings of intuitionistic fuzzy metric space to the open problem posed by Rhoades [28] regarding existence of a contractive definition which is strong enough to generate a fixed point, but which does not force the map to be continuous at the fixed point.