Fixed point problems for generalized contractions with applications

Abstract: In this paper, we investigate the conditions on the control mappings $\psi ,\varphi :(0,\infty )\rightarrow \mathbb{R}$ ψ , φ : ( 0 , ∞ ) → R that guarantee the existence of the fixed points of the mapping $T:X\rightarrow P(X)$ T : X … Show more

“…Later, a wide number of academics proved a variety of important fixed-point theorems in many types of metric spaces using various generalized contractions, as well as applications to fractional differential equations (see [21,23,29]). A variety of new models connected to the Caputo-Fabrizio derivative (CFD) have recently been constructed and demonstrated, see [18,34].…”

Orbital b-Metric Spaces and Related Fixed Point Results on Advanced Nashine-Wardowski-Feng-Liu Type Contractions with Applications

“…Later, a wide number of academics proved a variety of important fixed-point theorems in many types of metric spaces using various generalized contractions, as well as applications to fractional differential equations (see [21,23,29]). A variety of new models connected to the Caputo-Fabrizio derivative (CFD) have recently been constructed and demonstrated, see [18,34].…”

Orbital b-Metric Spaces and Related Fixed Point Results on Advanced Nashine-Wardowski-Feng-Liu Type Contractions with Applications

“…Gordji et al also presented a generalization of BCP in the orthogonal metric space. Later, Baghani et al [8] generalized the study done in [17] by using the concept of F-contraction, while Nazam et al [18] broadened the investigation conducted in [8].…”

On the Iterative Multivalued ⊥-Preserving Mappings and an Application to Fractional Differential Equation

“…They have studied many aspects of the Banach contraction principle and have further developed their findings. One of the most popular topics is studying new classes of spaces and their fundamental properties (see [9,10,11,18,20,27]).…”

Some recent and new fixed point results on orthogonal metric-like space