Metric space, Fixed-point theorem, Discrete mathematics, Coincidence point and Fixed-point property are his primary areas of study. The Metric space study which covers Partially ordered set that intersects with Complete metric space. The concepts of his Fixed-point theorem study are interwoven with issues in Type and Combinatorics.
Discrete mathematics and Monotone polygon are commonly linked in his work. As part of the same scientific family, Bessem Samet usually focuses on Coincidence point, concentrating on Least fixed point and intersecting with Differential geometry. Fixed-point property is a subfield of Fixed point that Bessem Samet explores.
Bessem Samet spends much of his time researching Mathematical analysis, Metric space, Fixed-point theorem, Pure mathematics and Discrete mathematics. His studies in Mathematical analysis integrate themes in fields like Cone and Nonlinear system. His Metric space study integrates concerns from other disciplines, such as Partially ordered set, Combinatorics and Metric.
In his study, Iterative method is inextricably linked to Uniqueness, which falls within the broad field of Fixed-point theorem. The Pure mathematics study combines topics in areas such as Class and Type. His work in Discrete mathematics covers topics such as Fixed point which are related to areas like Schauder fixed point theorem and Complete metric space.
Bessem Samet focuses on Applied mathematics, Mathematical analysis, Fractional calculus, Pure mathematics and Mathematical physics. His Applied mathematics research includes themes of Operational matrix, Uniqueness and Nonlinear system. His Uniqueness research is multidisciplinary, incorporating elements of Fixed-point theorem and Nonlinear integral equation.
In his research, Fixed point is intimately related to Matrix, which falls under the overarching field of Nonlinear system. He studies Pure mathematics, focusing on Metric space in particular. His work is dedicated to discovering how Metric space, Interpretation are connected with Generalization and other disciplines.
His primary areas of investigation include Applied mathematics, Fractional calculus, Partial differential equation, Mathematical analysis and Operational matrix. Bessem Samet interconnects Fixed-point iteration and Nonlinear system in the investigation of issues within Applied mathematics. Bessem Samet has researched Fractional calculus in several fields, including Regular polygon, Iterative method, Uniqueness, Exponential function and Function.
His research integrates issues of Pure mathematics, Type, Lyapunov function, Operator and Ordinary differential equation in his study of Partial differential equation. His research on Mathematical analysis often connects related topics like Compressibility. His work carried out in the field of Operational matrix brings together such families of science as Scheme, Order and Linear multistep method.
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Fixed point theorems for α–ψ-contractive type mappings
Bessem Samet;Calogero Vetro;Pasquale Vetro.
Nonlinear Analysis-theory Methods & Applications (2012)
Coupled fixed point theorems for a generalized Meir–Keeler contraction in partially ordered metric spaces
Nonlinear Analysis-theory Methods & Applications (2010)
Generalized - Contractive Type Mappings and Related Fixed Point Theorems with Applications
Erdal Karapınar;Bessem Samet.
Abstract and Applied Analysis (2012)
A new generalization of the Banach contraction principle
Mohamed Jleli;Bessem Samet.
Journal of Inequalities and Applications (2014)
Fixed point results for mappings satisfying (ψ,φ)-weakly contractive condition in partially ordered metric spaces
Hemant Kumar Nashine;Bessem Samet.
Nonlinear Analysis-theory Methods & Applications (2011)
Common fixed points of generalized contractions on partial metric spaces and an application
Ljubomir Ćirić;Bessem Samet;Hassen Aydi;Calogero Vetro.
Applied Mathematics and Computation (2011)
Remarks on G-metric spaces and fixed point theorems
Mohamed Jleli;Bessem Samet.
Fixed Point Theory and Applications (2012)
Coupled fixed point theorems for nonlinear contractions in partially ordered G-metric spaces
Hassen Aydi;Bosko Damjanovic;Bessem Samet;Wasfi A. Shatanawi.
Mathematical and Computer Modelling (2011)
Coupled fixed point theorems for mixed monotone mappings in ordered partial metric spaces
Wasfi A. Shatanawi;Bessem Samet;Mujahid Abbas.
Mathematical and Computer Modelling (2012)
Coupled fixed point, $F$-invariant set and fixed point of $N$-order
Bessem Samet;Calogero Vetro.
Annals of Functional Analysis (2010)
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