Sikander Ali | Resolvability | Best Researcher Award

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Mr. Sikander Ali | Resolvability | Best Researcher Award

Research Associate at Riphah International University Lahore, Pakistan📖

Sikander Ali is a dedicated mathematician with a strong focus on applied mathematics, particularly in Graph Theory, Chemical Graph Theory, Fuzzy Set Theory, and Cryptography. He has an academic background from COMSATS University, Sahiwal, and is an active researcher affiliated with various international applied mathematics research groups. Sikander has been awarded multiple honors, including the Young Scientist Award and the Best Research Award, recognizing his contributions to mathematics and research. He is currently a Research Associate and Visiting Lecturer at Riphah International University, Lahore, Pakistan.

Profile

Scopus Profile

Orcid Profile

Google Scholar Profile

Education Background🎓

Sikander completed his MS in Mathematics from COMSATS University, Sahiwal Campus, in January 2023, with a GPA of 3.42/4.0. His academic focus included Applied Mathematics, Graph Theory, and Chemical Graph Theory. He also holds an MSc in Mathematics from COMSATS University (2018-2020), where he secured a 2nd position in his class and earned a scholarship for his academic excellence. Earlier, Sikander completed his Bachelor’s degree in Mathematics from Govt College Bahawal Nagar in 2017.

Professional Experience🌱

Sikander Ali has gained substantial academic and research experience. He has worked as a Research Associate at Riphah International University since 2023 and later transitioned to a Visiting Lecturer role at the same institution. His responsibilities include delivering mathematics lectures and supervising research. Sikander has also taught mathematics at the Army Public School and College system.

Research Interests🔬

Sikander’s research interests primarily revolve around:

  • Graph Theory: Focused on Resolvability Parameters, Graph Labelling, and Fault-Tolerant Embedding of Graphs.
  • Cryptography: Investigating new cryptographic techniques and their applications.
  • Neutrosophic Fuzzy Sets: Exploring innovative methods in fuzzy set theory to address uncertainties in mathematical modeling.
  • Mathematical Resolvability: Developing novel resolvability parameters in graph theory and related fields.

Author Metrics

Sikander Ali has established a notable academic presence through his research in applied mathematics, particularly in the fields of Graph Theory, Cryptography, and Fuzzy Set Theory. His work has been widely recognized and cited in the academic community. Sikander’s contributions are accessible through his research profiles on Google Scholar, where he has accumulated citations that reflect the impact of his work on the field of mathematics. He is also active on ResearchGate, where he engages with a global community of researchers and shares his latest findings. Additionally, his ORCID profile highlights his academic credentials and provides a comprehensive overview of his research outputs. These author metrics demonstrate Sikander’s commitment to advancing knowledge in mathematics and his growing influence in the academic research community.

Publications Top Notes 📄

1. Resolving Set and Exchange Property in Nanotube

  • Authors: ANA Koam, S Ali, A Ahmad, M Azeem, MK Jamil
  • Journal: AIMS Mathematics
  • Volume & Issue: 8 (9), Pages 20305-20323
  • Year: 2023
  • Citations: 8

2. Novel Resolvability Parameter of Some Well-Known Graphs and Exchange Properties with Applications

  • Authors: S Ali, M Azeem, MA Zahid, M Usman, M Pal
  • Journal: Journal of Applied Mathematics and Computing
  • Volume & Issue: Volume 1, Pages 1-22
  • Year: 2024
  • Citations: 6

3. Double Resolvability Parameters of Fosmidomycin Anti-Malaria Drug and Exchange Property

  • Authors: R Ismail, S Ali, M Azeem, MA Zahid
  • Journal: Heliyon
  • Volume & Issue: 10 (13)
  • Year: 2024
  • Citations: 4

4. Utilizing Lexicographic Max Product of Picture Fuzzy Graph in Human Trafficking

  • Authors: P Liu, MH Asim, S Ali, M Azeem, B Almohsen
  • Journal: Ain Shams Engineering Journal
  • Volume & Issue: 15 (11), Article 103009
  • Year: 2024
  • Citations: 3

5. Double Edge Resolving Set and Exchange Property for Nanosheet Structure

  • Authors: ANA Koam, A Ahmad, S Ali, MK Jamil, M Azeem
  • Journal: Heliyon
  • Volume & Issue: 10 (5)
  • Year: 2024
  • Citations: 3

Conclusion

Sikander Ali’s profile as a mathematician, researcher, and educator is marked by a combination of academic excellence, innovative research, and significant contributions to the advancement of applied mathematics. His focus on mathematical resolvability, cryptography, and fuzzy set theory, along with his strong academic background and active research output, make him a deserving candidate for the Best Researcher Award. Sikander’s commitment to advancing knowledge in mathematics, along with his dedication to teaching and mentoring, makes him a significant figure in the academic community. With continued research, collaboration, and application of his work in real-world scenarios, Sikander has the potential to make even more significant contributions to the field of applied mathematics.

Umar Ali | Graph Theory | Best Researcher Award

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Dr. Umar Ali | Graph Theory | Best Researcher Award

Post doc at University of Shanghai for Science and Technology,  China📖

Dr. Umar Ali is a skilled mathematician with a focus on graph theory, spectral graph theory, and mathematical chemistry. He holds a Ph.D. in Mathematics from Anhui University, China, where his research centered on resistance distance-based graph invariants and spanning trees in specific classes of graphs. With extensive academic training and a commitment to advancing mathematical knowledge, Dr. Ali is proficient in mathematical modeling, analysis, and software applications, aiming to provide bespoke solutions for real-world problems.

Profile

Scopus Profile

Education Background🎓

  • Ph.D. in Mathematics (2018-2022), School of Mathematical Sciences, Anhui University, Hefei, China.
    Dissertation: Resistance Distance-Based Graph Invariants and Spanning Tree in Some Classes of Graphs.
    Supervisor: Prof. Xiang-Feng Pan
  • MPhil in Mathematics (2015-2017), University of Management and Technology (UMT), Lahore, Pakistan.
    Dissertation: 3-Total Edge Product Cordial Labelling of Some Standard Classes of Graphs and Convex Polytopes.
    Supervisor: Dr. Zohaib Zahid
  • M.Sc. in Mathematics (2010-2013), University of the Punjab, Lahore, Pakistan.
  • B.Sc. in Mathematics (2007-2010), University of the Punjab, Lahore, Pakistan.

Professional Experience🌱

Dr. Umar Ali has served as a researcher and lecturer at several academic institutions, contributing to the advancement of mathematical sciences. His expertise lies in graph theory and algebraic combinatorics. He has collaborated with various international scholars and researchers on cutting-edge mathematical problems and is actively involved in the publication of research papers in prestigious journals. Dr. Ali has also been a reviewer for several scientific journals, enhancing his engagement with the academic community.

Research Interests🔬

Dr. Umar Ali’s research interests include:

  • Discrete Mathematics
  • Graph Theory
  • Spectral Graph Theory
  • Algebraic Combinatorics
  • Mathematical Chemistry
  • Chemical Graph Theory

Author Metrics

Dr. Ali has authored several research papers, with notable publications in journals such as Polycyclic Aromatic Compounds (IF 3.744) and Symmetry (IF 2.713). His contributions include work on the normalized Laplacian spectrum, Kirchhoff index, resistance distance, and spanning trees in various graph structures. He has published in SCI-indexed journals and contributed significantly to the mathematical community.

Publications Top Notes 📄

1. Computing the Laplacian Spectrum and Wiener Index of Pentagonal-Derivation Cylinder/Möbius Network

Authors: Ali, U., Li, J., Ahmad, Y., Raza, Z.
Journal: Heliyon
Year: 2024
Volume: 10
Issue: 2
Article Number: e24182
DOI: Link disabled (No DOI available)
Abstract: This paper examines the Laplacian spectrum and Wiener index of the pentagonal-derivation cylinder and Möbius network. These networks are studied in the context of graph theory and chemical graph theory, exploring how their mathematical properties influence their structure and behavior.

2. Computing the Normalized Laplacian Spectrum and Spanning Tree of the Strong Prism of Octagonal Network

Authors: Ahmad, Y., Ali, U., Siddique, I., Afifi, W.A., Abd-El-Wahed Khalifa, H.
Journal: Journal of Mathematics
Year: 2022
Article ID: 9269830
DOI: 10.1155/2022/9269830
Abstract: This paper explores the normalized Laplacian spectrum and spanning tree properties of the strong prism of an octagonal network. The study aims to provide a deeper understanding of the structural properties of networks with octagonal symmetry and their applications in network science.

3. Resistance Distance-Based Indices and Spanning Trees of Linear Pentagonal-Quadrilateral Networks

Authors: Ali, U., Ahmad, Y., Xu, S.-A., Pan, X.-F.
Journal: Polycyclic Aromatic Compounds
Year: 2022
Volume: 42
Issue: 9
Pages: 6352–6371
DOI: Link disabled (No DOI available)
Abstract: This article focuses on the resistance distance-based indices and spanning tree properties of linear pentagonal-quadrilateral networks. It discusses how these networks’ resistance distance properties and spanning trees provide insight into the connectivity and robustness of the systems in question, with particular relevance to chemical graph theory.

4. On Normalized Laplacian, Degree-Kirchhoff Index of the Strong Prism of Generalized Phenylenes

Authors: Ali, U., Ahmad, Y., Xu, S.-A., Pan, X.-F.
Journal: Polycyclic Aromatic Compounds
Year: 2022
Volume: 42
Issue: 9
Pages: 6215–6232
DOI: Link disabled (No DOI available)
Abstract: This paper delves into the normalized Laplacian and degree-Kirchhoff indices of the strong prism of generalized phenylenes, contributing to the field of chemical graph theory. The work analyzes the impact of these indices on the stability and chemical properties of molecular networks.

5. On Normalized Laplacians, Degree-Kirchhoff Index, and Spanning Tree of Generalized Phenylene

Authors: Ali, U., Raza, H., Ahmed, Y.
Journal: Symmetry
Year: 2021
Volume: 13
Issue: 8
Article Number: 1374
DOI: Link disabled (No DOI available)
Abstract: This research investigates the normalized Laplacian, degree-Kirchhoff index, and spanning tree of generalized phenylene. The work aims to provide insights into the mathematical properties of molecular networks, particularly focusing on how these indices relate to the stability and behavior of chemical structures.

Conclusion

Dr. Umar Ali is a highly deserving candidate for the Best Researcher Award based on his deep expertise in graph theory, innovative contributions to chemical graph theory, and the substantial impact his research has had on both theoretical and applied mathematics. His academic credentials, research collaborations, and high-quality publications place him in an excellent position for this prestigious recognition.

His strengths in research output, theoretical advancements, and academic contributions clearly demonstrate that he is on the path to becoming a leading figure in his field. A slight improvement in interdisciplinary applications and engagement with industry could further elevate his already impressive profile. Given his outstanding achievements, Dr. Ali is a fitting candidate for the Best Researcher Award.