Fixed Point Results for Generalized $(\alpha, \eta, (Q,h),\mathcal{F})-$ contraction mappings on Double controlled Metric Type Spaces

This article introduces a new class of contraction mappings, referred to as (α,η,(Q,h),F)--contractions, within the framework of double controlled metric type spaces. These mappings are formulated using α -admissible and η -subadmissible functions, along with a pair (Q, h) of the upper class of type I, combined with Wardowski's F-contraction. Our result establishes the existence and uniqueness of the fixed points for these generalized mappings. Additionally, we present a few corollaries of the main theorem.