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- Naseer Shahzad

Mathematics

Saudi Arabia

2023

Discipline name
D-index
D-index (Discipline H-index) only includes papers and citation values for an examined
discipline in contrast to General H-index which accounts for publications across all
disciplines.
Citations
Publications
World Ranking
National Ranking

Mathematics
D-index
49
Citations
8,113
322
World Ranking
848
National Ranking
9

2023 - Research.com Mathematics in Saudi Arabia Leader Award

- Metric space
- Geometry
- Mathematical analysis

Naseer Shahzad is involved in relevant fields of research such as Point (geometry) and Monotone polygon in the domain of Geometry. Naseer Shahzad undertakes interdisciplinary study in the fields of Point (geometry) and Geometry through his research. Naseer Shahzad merges many fields, such as Mathematical analysis and Variational inequality, in his writings. As part of his studies on Pure mathematics, Naseer Shahzad often connects relevant subjects like Banach space. The study of Banach space is intertwined with the study of Mathematical analysis in a number of ways. With his scientific publications, his incorporates both Fixed point and Fixed-point theorem. Naseer Shahzad applies his multidisciplinary studies on Fixed-point theorem and Fixed point in his research. His study deals with a combination of Discrete mathematics and Combinatorics. His work blends Combinatorics and Pure mathematics studies together.

- Convergence and existence results for best proximity points (223 citations)
- Fixed Point Theory in Distance Spaces (176 citations)
- Some fixed point generalizations are not real generalizations (145 citations)

Naseer Shahzad connects relevant research areas such as Point (geometry), Regular polygon and Monotone polygon in the realm of Geometry. He connects Point (geometry) with Geometry in his study. He incorporates Mathematical analysis and Variational inequality in his research. His research on Pure mathematics often connects related topics like Metric space. His Metric space study frequently draws connections to other fields, such as Discrete mathematics. Naseer Shahzad performs multidisciplinary study in the fields of Discrete mathematics and Applied mathematics via his papers. His work often combines Applied mathematics and Mathematical analysis studies. His work often combines Fixed point and Fixed-point theorem studies. Naseer Shahzad integrates several fields in his works, including Fixed-point theorem and Fixed point.

- Mathematical analysis (78.84%)
- Pure mathematics (70.90%)
- Discrete mathematics (59.79%)

- Mathematical analysis (91.67%)
- Pure mathematics (91.67%)
- Fixed point (83.33%)

Naseer Shahzad works mostly in the field of Axiom, limiting it down to topics relating to Geometry and, in certain cases, Point (geometry), Differential geometry, Geodesic and Regular polygon. He conducts interdisciplinary study in the fields of Point (geometry) and Metric space through his research. He performs multidisciplinary study on Regular polygon and Geometry in his works. His study brings together the fields of Inequality and Mathematical analysis. As part of his studies on Inequality, Naseer Shahzad often connects relevant areas like Mathematical analysis. Many of his studies involve connections with topics such as Field (mathematics) and Pure mathematics. His research on Field (mathematics) often connects related topics like Pure mathematics. By researching both Fixed point and Fixed-point theorem, he produces research that crosses academic boundaries. He connects Fixed-point theorem with Fixed point in his study.

- Convergence of Tseng-type self-adaptive algorithms for variational inequalities and fixed point problems (19 citations)
- Some new fixed point theorems under $$(\mathcal {A},\mathcal {S})$$ ( A , S ) -contractivity conditions (15 citations)
- Fixed point theorems by combining Jleli and Samets, and Branciaris inequalities (14 citations)

- Inequality
- Binary relation
- Mathematical analysis

His work is dedicated to discovering how Axiom, Geometry are connected with Point (geometry) and other disciplines. Naseer Shahzad merges Point (geometry) with Geometry in his study. His Pure mathematics study frequently links to other fields, such as Field (mathematics). Field (mathematics) connects with themes related to Pure mathematics in his study. His Mathematical analysis study frequently involves adjacent topics like Inequality. His Inequality study frequently draws parallels with other fields, such as Mathematical analysis. With his scientific publications, his incorporates both Fixed-point theorem and Fixed point. He carries out multidisciplinary research, doing studies in Fixed point and Fixed-point theorem. His research combines Class (philosophy) and Artificial intelligence.

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.

Convergence and existence results for best proximity points

M.A. Al-Thagafi;Naseer Shahzad.

Nonlinear Analysis-theory Methods & Applications **(2009)**

374 Citations

Fixed Point Theory in Distance Spaces

William Kirk;Naseer Shahzad.

**(2014)**

345 Citations

On fixed points of α-ψ-contractive multifunctions

J Hasanzade Asl;S Rezapour;S Rezapour;N Shahzad.

Fixed Point Theory and Applications **(2012)**

278 Citations

On Mann and Ishikawa iteration schemes for multi-valued maps in Banach spaces

Naseer Shahzad;Habtu Zegeye.

Nonlinear Analysis-theory Methods & Applications **(2009)**

269 Citations

Some fixed point generalizations are not real generalizations

R.H. Haghi;Sh. Rezapour;N. Shahzad.

Nonlinear Analysis-theory Methods & Applications **(2011)**

260 Citations

GENERALIZED I-NONEXPANSIVE SELFMAPS AND INVARIANT APPROXIMATIONS

M. A. Al-Thagafi;Naseer Shahzad.

Acta Mathematica Sinica **(2008)**

260 Citations

Some results on fixed points of α - ψ -Ciric generalized multifunctions

B Mohammadi;S Rezapour;N Shahzad.

Fixed Point Theory and Applications **(2013)**

195 Citations

Be careful on partial metric fixed point results

R.H. Haghi;Sh. Rezapour;N. Shahzad.

Topology and its Applications **(2013)**

155 Citations

Strong convergence of an implicit iteration process for a finite family of nonexpansive mappings

C.E. Chidume;Naseer Shahzad.

Nonlinear Analysis-theory Methods & Applications **(2005)**

148 Citations

Some fixed point results on a metric space with a graph

S.M.A. Aleomraninejad;Sh. Rezapour;N. Shahzad.

Topology and its Applications **(2012)**

137 Citations

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