“…First, by modifying the established axioms of metric spaces, researchers have introduced a plethora of novel spaces, collectively referred to as generalized metric spaces. Examples of these include b-metric spaces, partial-metric spaces, metric-like spaces, cone-metric spaces, G-metric spaces, and rectangular-metric spaces, among others see [7][8][9]. Alternatively, mathematicians have substituted the contraction condition with various alternative conditions that broaden the concept of contraction.…”