Solving a nonlinear integral equation via orthogonal metric space

We propose the concept of orthogonally triangular $ \alpha $-admissible mapping and demonstrate some fixed point theorems for self-mappings in orthogonal complete metric spaces. Some of the well-known outcomes in the literature are generalized and expanded by our results. An instance to help our outcome is presented. We also explore applications of our key results.

[1]  Gunaseelan Mani,et al.  Fixed Point of Orthogonal F-Suzuki Contraction Mapping on O-Complete b-Metric Spaces with Applications , 2021, Journal of Function Spaces.

[2]  Jung Rye Lee,et al.  Orthogonal m-metric spaces and an application to solve integral equations , 2021 .

[3]  C. Bai,et al.  Fixed point theorem for orthogonal contraction of Hardy-Rogers-type mapping on $O$-complete metric spaces , 2020, AIMS Mathematics.

[4]  D. Turkoglu,et al.  Fixed point theorems on orthogonal metric spaces via altering distance functions , 2019, THIRD INTERNATIONAL CONFERENCE OF MATHEMATICAL SCIENCES (ICMS 2019).

[5]  Y. Cho,et al.  Fixed point theorems for orthogonal F-contraction mappings on O-complete metric spaces , 2019, Journal of Fixed Point Theory and Applications.

[6]  M. Eshaghi,et al.  Fixed Point Theory in ε-connected Orthogonal Metric Space , 2019 .

[7]  M. Gordji,et al.  Fixed point theory in generalized orthogonal metric space , 2017 .

[8]  Madjid Eshaghi Gordji,et al.  On orthogonal sets and Banach fixed point theorem , 2017 .

[9]  M. Ramezani Orthogonal metric space and convex contractions , 2015 .

[10]  Poom Kumam,et al.  Some fixed point theorems concerning F-contraction in complete metric spaces , 2014, Fixed Point Theory and Applications.

[11]  E. Karapınar,et al.  Fixed Point Theorems for a Class of α-Admissible Contractions and Applications to Boundary Value Problem , 2014 .

[12]  Dariusz Wardowski,et al.  Fixed points of a new type of contractive mappings in complete metric spaces , 2012 .

[13]  Salvatore Sessa,et al.  Fixed point theorems by altering distances between the points , 1984, Bulletin of the Australian Mathematical Society.