Fixed point theory is a cornerstone of mathematical analysis that investigates conditions under which maps on metric spaces yield invariant points. Traditionally exemplified by the Banach contraction ...

In this paper, we define Suzuki type generalized multivalued almost contraction mappings and prove some related fixed point results. As an application, some coincidence and common fixed point results ...

Fixed point theory began with Banach contraction principle in complete metric spaces. Completeness is a major and important condition for fixed point theorems. In this paper, we define orthogonal (E.A ...