His scientific interests lie mostly in Metric space, Convex metric space, Discrete mathematics, Pure mathematics and Injective metric space. His Metric space study frequently links to adjacent areas such as Fixed point. His research investigates the connection between Convex metric space and topics such as Product metric that intersect with problems in Periodic point, Banach space and Fixed-point space.
His research in the fields of Fixed-point theorem overlaps with other disciplines such as Contraction. His Injective metric space course of study focuses on Dual cone and polar cone and Kakutani fixed-point theorem, Schauder fixed point theorem, Brouwer fixed-point theorem and Combinatorics. His Mathematical analysis study combines topics from a wide range of disciplines, such as Cone and Contraction.
Stojan Radenović mostly deals with Metric space, Fixed point, Pure mathematics, Discrete mathematics and Fixed-point theorem. His Metric space research is included under the broader classification of Mathematical analysis. His research integrates issues of Class, Cone and Contraction in his study of Pure mathematics.
His work carried out in the field of Discrete mathematics brings together such families of science as Point, Complement and Generalization. His work investigates the relationship between Fixed-point theorem and topics such as Differential geometry that intersect with problems in Topology. His study in Convex metric space is interdisciplinary in nature, drawing from both Product metric and Injective metric space.
Stojan Radenović spends much of his time researching Pure mathematics, Metric space, Fixed point, Fixed-point theorem and Type. His study on Coincidence point is often connected to Context as part of broader study in Pure mathematics. His Metric space study is related to the wider topic of Discrete mathematics.
His Fixed point research includes themes of Sequence, Mathematical proof, Metric and Nonlinear system. His work in the fields of Contraction principle overlaps with other areas such as Alpha. The concepts of his Type study are interwoven with issues in Current, Uniqueness, Space, Point and Order.
Pure mathematics, Fixed point, Metric space, Fixed-point theorem and Discrete mathematics are his primary areas of study. His Pure mathematics study also includes
As a part of the same scientific study, Stojan Radenović usually deals with the Metric space, concentrating on Cone and frequently concerns with Space, Banach algebra, Operator theory and Complement. His Fixed-point theorem research is multidisciplinary, incorporating perspectives in Type and Fuzzy logic. When carried out as part of a general Discrete mathematics research project, his work on Common fixed point is frequently linked to work in Alpha, therefore connecting diverse disciplines of study.
This overview was generated by a machine learning system which analysed the scientist’s body of work. If you have any feedback, you can contact us here.
On cone metric spaces: A survey
Slobodanka Janković;Zoran Kadelburg;Stojan Radenović.
Nonlinear Analysis-theory Methods & Applications (2011)
Common coupled fixed point theorems in cone metric spaces for w-compatible mappings
M. Abbas;M. Ali Khan;S. Radenović.
Applied Mathematics and Computation (2010)
Common Fixed Point Results in Metric-Type Spaces
Mirko Jovanović;Zoran Kadelburg;Stojan Radenović.
Fixed Point Theory and Applications (2010)
A note on the equivalence of some metric and cone metric fixed point results
Zoran Kadelburg;Stojan Radenović;Vladimir Rakočević.
Applied Mathematics Letters (2011)
COMMON FIXED POINT THEOREMS FOR WEAKLY COMPATIBLE PAIRS ON CONE METRIC SPACES
G. Jungck;S. Radenovic;S. Radojevic;V. Rakocevic.
Fixed Point Theory and Applications (2009)
A New Approach to the Study of Fixed Point Theory for Simulation Functions
Farshid Khojasteh;Satish Shukla;Stojan Radenovic.
Suzuki-type fixed point results in metric type spaces
Nawab Hussain;Dragan Ðorić;Zoran Kadelburg;Stojan Radenović.
Fixed Point Theory and Applications (2012)
Fixed point theorem for two non-self mappings in cone metric spaces
Stojan Radenović;B. E. Rhoades.
Computers & Mathematics With Applications (2009)
Common fixed points of four maps in partially ordered metric spaces
Mujahid Abbas;Talat Nazir;Stojan Radenović.
Applied Mathematics Letters (2011)
Fixed point theorems of generalized Lipschitz mappings on cone metric spaces over Banach algebras without assumption of normality
Shaoyuan Xu;Stojan Radenović.
Fixed Point Theory and Applications (2014)
If you think any of the details on this page are incorrect, let us know.
We appreciate your kind effort to assist us to improve this page, it would be helpful providing us with as much detail as possible in the text box below: