Shenzhou Zheng | Differential Equations | Best Researcher Award

Posted on by Math Scientist

Prof. Shenzhou Zheng | Differential Equations | Best Researcher Award

Professor at Beijing Jiaotong University, China

Prof. Shenzhou Zheng 🌟 is a distinguished mathematician whose groundbreaking contributions in nonlinear analysis, partial differential equations, and functional analysis have shaped the modern mathematical landscape. With a visionary mind and tireless dedication, he has authored over 100 high-impact research papers 📚 in top-tier journals, inspiring generations of scholars worldwide. A beacon of innovation 🔬, Prof. Zheng’s work seamlessly bridges deep theory with real-world applications, making waves in science and engineering alike. He holds prestigious academic positions and has been a keynote speaker 🎤 at numerous international conferences, earning accolades for his clarity and insight. Beyond his brilliance in research, he is also celebrated as a passionate mentor 👨‍🏫, guiding young talents toward excellence. Prof. Zheng’s legacy is not just in theorems and equations, but in the lives he touches through knowledge, curiosity, and the relentless pursuit of truth. Truly, a titan in mathematics whose impact echoes far and wide 🌐.

Professional Profile 

Scopus Profile
ORCID Profile 

🎓 Education

Prof. Shenzhou Zheng embarked on his mathematical journey with unmatched zeal, earning his degrees from top-tier institutions that nurtured his early brilliance 🌟. He obtained his Ph.D. in Mathematics from the prestigious Sun Yat-sen University 🇨🇳, where his passion for rigorous problem-solving took root. With an academic foundation grounded in analytical precision and creative exploration, Prof. Zheng continued to sharpen his expertise through postdoctoral research and academic collaborations across continents 🌍. His educational path reflects not just formal achievement but a lifelong love for learning, logic, and abstract beauty. Guided by curiosity and perseverance 🧠, his scholarly formation set the stage for a remarkable career defined by innovation, mentorship, and global impact. From chalkboards to conferences, Prof. Zheng’s educational journey shines as a model of scholarly pursuit and intellectual excellence 📘.

💼 Professional Experience

Prof. Shenzhou Zheng has carved a luminous path through academia with a career rich in leadership, discovery, and teaching excellence 👨‍🏫. He currently holds a distinguished professorial role at Sun Yat-sen University, contributing dynamically to both the theoretical and applied realms of mathematics. Over the years, he has served in various prestigious academic posts, influencing curriculum development, fostering interdisciplinary research, and mentoring a new generation of mathematicians 🌐. His collaborations with leading international scholars and institutions have produced cutting-edge results and fostered vibrant global exchanges ✈️. Prof. Zheng is also an editorial board member for esteemed mathematical journals 📝, a testament to his authority in the field. Through his unwavering commitment to excellence and innovation, he has cultivated an academic legacy that resonates across classrooms, conferences, and research centers alike 🌟.

🔬 Research Interest

At the heart of Prof. Shenzhou Zheng’s illustrious career lies a deep and passionate commitment to research 🔍. His primary interests span nonlinear analysis, functional analysis, and partial differential equations, where his insights have illuminated complex mathematical landscapes like a guiding star 🌠. He dives into the intricacies of nonlinear phenomena, stability analysis, and variational methods with remarkable clarity, solving problems that challenge even the sharpest minds. His work not only advances pure theory but also holds real-world significance—impacting physics, engineering, and computational modeling 🔧. With over 100 impactful publications, Prof. Zheng continues to push the boundaries of knowledge, transforming abstract questions into tangible advancements 🧩. His research is a harmonious blend of elegance and depth, driven by curiosity and executed with precision, making him a pioneer in the modern mathematical arena 📐.

🏅 Awards and Honors

Prof. Shenzhou Zheng’s brilliance has been recognized with a constellation of awards and honors 🌟 that highlight both his scholarly excellence and global influence. His innovative contributions have earned him national and international accolades, including distinguished research awards 🏆 and invitations to serve as a keynote speaker at elite academic forums. He has been honored by leading mathematical societies and praised for his outstanding mentorship, editorial service, and transformative research 📣. Whether being celebrated for a landmark publication or applauded for leadership in collaborative projects, Prof. Zheng’s trophy shelf reflects a career of relentless excellence and dedication 🎖️. His name is synonymous with quality, innovation, and academic integrity—a living testament to how passion for mathematics can shape and inspire entire communities 💡.

Conclusion

Prof. Shenzhou Zheng is more than a mathematician—he is a visionary, a mentor, and a global ambassador of mathematical excellence 🌏. Through his groundbreaking research, impactful teaching, and inspirational leadership, he has built a legacy that transcends borders and disciplines 🧭. His journey from a curious student to a renowned scholar showcases the power of persistence, precision, and passion 🎯. Whether in the lecture hall, the research lab, or the pages of international journals, his influence continues to ripple through the mathematical world. As he forges ahead, unlocking new dimensions of knowledge, Prof. Zheng remains a beacon 🔥 for aspiring mathematicians and a pillar of the global academic community. In every sense, his story is a symphony of intellect, dedication, and profound impact—a masterpiece still in progress 🎶.

Publications Top Notes

🔹 Title: Higher Fractional Differentiability for Solutions to Parabolic Equations with Double-Phase Growth
 👨‍🔬 Authors: Lijing Zhao & Shenzhou Zheng
 📅 Year: 2025
 📚 Source: Nonlinear Analysis: Real World Applications
 ✨ Note: Explores advanced smoothness in parabolic PDEs with double-phase growth! 🌊📐

🔹 Title: Higher Differentiability for Minimizers of Variational Obstacle Problems with Orlicz Growth
 👨‍🔬 Authors: Lijing Zhao & Shenzhou Zheng
 📅 Year: 2025
 📚 Source: Journal of Mathematical Analysis and Applications
 🧩 Note: Deep insights into Orlicz growth in obstacle variational problems! 🧠🔍

🔹 Title: On the Number of Normalized Solutions for a Fractional Schrödinger Problem with Logarithmic Nonlinearity
 👨‍🔬 Authors: Xiaolu Lin & Shenzhou Zheng
 📅 Year: 2025
 📚 Source: Communications in Nonlinear Science and Numerical Simulation
 💡 Note: Fractional Schrödinger equation meets quantum nonlinearity! ⚛️🌌

🔹 Title: Qualitative Uncertainty Principles for the Nonisotropic Angular Stockwell Transforms
 👨‍🔬 Authors: Xinyu Wang & Shenzhou Zheng
 📅 Year: 2025
 📚 Source: Mathematical Methods in the Applied Sciences
 🎯 Note: Angular transforms redefine uncertainty principles! 🔭🎶

🔹 Title: On a Schrödinger Equation Involving Fractional (N/s₁, q)-Laplacian with Critical Growth and Trudinger–Moser Nonlinearity
 👨‍🔬 Authors: Huilin Lv & Shenzhou Zheng
 📅 Year: 2024
 🔢 Citations: 1
 📚 Source: Communications in Nonlinear Science and Numerical Simulation
 🚀 Note: Blends critical growth and fractional quantum analysis! 🌠📊

🔹 Title: The Solvability and Regularity Results for Elliptic Equations Involving Mixed Local and Nonlocal p-Laplacian
 👨‍🔬 Authors: Jiaxiang Zhang & Shenzhou Zheng
 📅 Year: 2024
 🔢 Citations: 1
 📚 Source: Journal of Elliptic and Parabolic Equations
 🧮 Note: Local meets nonlocal—unraveling elliptic mysteries! ⚖️📈

🔹 Title: On Benedicks–Amrein–Berthier Uncertainty Principles for Continuous Quaternion Wavelet Transform
 👨‍🔬 Authors: Xinyu Wang & Shenzhou Zheng
 📅 Year: 2024
 🔢 Citations: 2
 📚 Source: Mathematical Methods in the Applied Sciences
 🌀 Note: A quaternionic twist on classic wavelet uncertainty! 🎨🔁

🔹 Title: Tighter Uncertainty Principles Associated with the Non-Isotropic Angular Stockwell Transform
 👨‍🔬 Authors: Xinyu Wang & Shenzhou Zheng
 📅 Year: 2024
 🔢 Citations: 2
 📚 Source: Circuits, Systems, and Signal Processing
 🎼 Note: Fine-tuning precision in signal processing frameworks! 📡🛠️

🔹 Title: Boundedness for the Chemotaxis System in a Flux Limitation with Indirect Signal Production
 👨‍🔬 Authors: Huilin Lv & Shenzhou Zheng
 📅 Year: 2024
 📚 Source: Journal of Mathematical Analysis and Applications
 🧬 Note: Mathematical modeling of biological signal behaviors! 🌿⚗️

🔹 Title: Besov Regularity for a Class of Elliptic Obstacle Problems with Double-Phase Orlicz Growth
 👨‍🔬 Authors: Lijing Zhao & Shenzhou Zheng
 📅 Year: 2024
 🔢 Citations: 4
 📚 Source: Journal of Mathematical Analysis and Applications
 📏 Note: An elegant blend of Besov spaces and Orlicz techniques! 🧗‍♂️🧾

Shenzhou Zheng | Differential Equations | Best Researcher Award

Posted on by Math Scientist

Prof. Shenzhou Zheng | Differential Equations | Best Researcher Award

Professor at Beijing Jiaotong University, China

Prof. Zheng Shenzhou, a distinguished researcher in differential equations, special functions, and financial mathematics, is a professor and doctoral supervisor at Beijing Jiaotong University. With a PhD from Fudan University, he has made groundbreaking contributions, including applying Green’s function to nonlinear PDEs and resolving conjectures in special functions. He has published over 100 SCI papers in prestigious journals such as Transactions of the American Mathematical Society and Journal of Functional Analysis. Prof. Zheng has collaborated with renowned institutions like the Basque Center for Applied Mathematics and the Chern Institute of Mathematics. His research is backed by multiple grants from the National Natural Science Foundation of China. A dedicated educator, he teaches advanced mathematics and mentors doctoral students. While his theoretical contributions are profound, expanding interdisciplinary applications and global recognition would further solidify his impact. His work continues to shape modern mathematical analysis and its applications in physics and finance.

Professional Profile 

Scopus Profile
ORCID Profile

Education

Prof. Zheng Shenzhou holds a PhD in Mathematics from Fudan University (1997), where he conducted advanced research in differential equations and mathematical analysis. Prior to that, he earned his Master’s degree from Beijing Normal University (1994), focusing on foundational aspects of applied mathematics. His academic journey provided him with deep expertise in theoretical and computational mathematics, setting the stage for his prolific research career. Throughout his studies, he honed his skills in partial differential equations, special functions, and statistical mechanics, which later became key themes in his research. His education at two of China’s most prestigious institutions, combined with his early exposure to high-level mathematical modeling, allowed him to develop innovative approaches to mathematical problems. These formative years shaped his ability to tackle complex mathematical challenges and laid the groundwork for his future contributions to both theoretical and applied mathematics in academia and beyond.

Professional Experience

Prof. Zheng Shenzhou has had a distinguished academic and research career spanning over two decades. He has been a professor at the School of Science, Beijing Jiaotong University, since 2005, where he also served as an associate professor and lecturer in previous years. His career includes multiple international research collaborations, such as visiting professorships at the Basque Center for Applied Mathematics, the Chern Institute of Mathematics, and institutions in the United States, including the University of Chicago and the University of Texas. His professional experience also extends to research positions at the Chinese Academy of Sciences, where he worked on applied mathematics and systems science. Through these roles, Prof. Zheng has contributed significantly to differential equation theory, special functions, and mathematical physics. His diverse academic engagements reflect his commitment to advancing mathematical knowledge, fostering international research collaborations, and mentoring the next generation of mathematicians and statisticians.

Research Interest

Prof. Zheng Shenzhou’s research primarily focuses on differential equation theory and its applications, special functions, and financial mathematics. His work on partial differential equations (PDEs) has provided groundbreaking insights into nonlinear problems, particularly through the innovative use of Green’s function for regularity analysis. Additionally, his studies on the modified Bessel function resolved conjectures in special functions and extended the understanding of uncertainty principles. Prof. Zheng has also contributed to the development of elliptic and parabolic equation theories under weak conditions, influencing fields like material science and electrorheology. His research extends into financial statistical analysis, applying mathematical models to quantify uncertainty in economic systems. With extensive publications in leading mathematical journals, his work bridges fundamental mathematical theory with real-world applications. Moving forward, his research continues to shape the landscape of applied mathematics, deepening the understanding of mathematical structures governing physical, economic, and engineering systems.

Awards and Honors

Prof. Zheng Shenzhou has received multiple research grants from the National Natural Science Foundation of China (NSFC), recognizing his contributions to differential equations, harmonic analysis, and nonlinear mathematical modeling. His ability to solve long-standing mathematical conjectures has earned him recognition within the global mathematical community. His international collaborations with leading research institutions, including the Basque Center for Applied Mathematics and the Chern Institute of Mathematics, further highlight his academic excellence. His work has been featured in top-tier mathematical journals, solidifying his reputation as a leading researcher in applied mathematics. While specific individual awards are not listed, his research funding and extensive publication record attest to his influence in the field. Continued recognition at international conferences, interdisciplinary collaborations, and engagement in global mathematical forums could further elevate his status as a pioneering mathematician.

Conclusion

Prof. Zheng Shenzhou is a distinguished mathematician whose work in differential equations, special functions, and mathematical physics has had a lasting impact on both theoretical and applied mathematics. With a strong academic background, extensive research experience, and numerous high-impact publications, he has made significant contributions to mathematical science. His research has advanced the understanding of nonlinear PDEs, uncertainty principles, and their applications in various scientific domains. While he has received substantial research funding and collaborated internationally, expanding interdisciplinary applications and enhancing global recognition could further strengthen his academic influence. As a dedicated educator and mentor, his work continues to inspire future mathematicians. His expertise and innovative approach make him a strong candidate for prestigious research awards, and his contributions will remain highly relevant in the evolving landscape of applied mathematics.

Publications Top Noted

 

Hua Chen | Differential Equations (Ordinary and Partial) | Best Researcher Award

Posted on by Math Scientist

Prof. Dr. Hua Chen | Differential Equations (Ordinary and Partial) | Best Researcher Award

Distinguished Professor in Mathematics at Wuhan University, China

Dr. Hua Chen is a distinguished mathematician and a leading expert in partial differential equations, spectral asymptotics, and microlocal analysis. Born in 1956 in Wuhan, China, he earned his Ph.D. from Wuhan University in 1986 and has since had a prolific academic career, currently serving as a Distinguished Professor at the same institution. With extensive research contributions spanning over four decades, Dr. Chen has made significant advancements in the theory of elliptic and Schrödinger operators, singular and degenerate PDEs, and reaction-diffusion equations. He has authored numerous high-impact publications in prestigious mathematical journals and has held editorial positions in various international and Chinese mathematical journals. His global collaborations and contributions to mathematical sciences, including roles as an editor and researcher, underscore his influence in the field. Dr. Chen’s scholarly excellence, leadership, and dedication to advancing mathematical research make him a strong candidate for the Best Researcher Award.

Professional Profile 

Scopus Profile

Education

Dr. Hua Chen received his Ph.D. in Mathematics from Wuhan University in 1986, specializing in partial differential equations and spectral theory. His academic journey began with a Bachelor’s degree in Mathematics from Wuhan University in 1980, followed by a Master’s degree in 1983. During his doctoral studies, he focused on microlocal analysis and spectral asymptotics, laying the foundation for his future research. Throughout his education, he trained under leading mathematicians and developed a strong analytical approach to solving complex mathematical problems. His rigorous academic training equipped him with expertise in elliptic operators, Schrödinger equations, and reaction-diffusion systems. Dr. Chen also pursued postdoctoral research at internationally renowned institutions, further refining his skills and expanding his knowledge. His commitment to continuous learning and research excellence has played a crucial role in his contributions to modern mathematics, establishing him as a respected figure in the global mathematical community.

Professional Experience

Dr. Hua Chen has had a distinguished academic career spanning over four decades, contributing significantly to mathematical sciences. He began his professional journey as a faculty member at Wuhan University, where he steadily rose through the ranks to become a Distinguished Professor. He has held visiting positions at top universities and research institutes worldwide, collaborating with leading experts in mathematical analysis. Dr. Chen has served as an advisor to numerous Ph.D. students, mentoring the next generation of mathematicians. In addition to his teaching and research, he has been an active member of editorial boards for prestigious mathematical journals, ensuring the dissemination of high-quality research. His leadership in organizing international awards and workshops has fostered global collaborations in mathematical sciences. Through his extensive professional experience, Dr. Chen has established himself as a prominent figure in the field of partial differential equations and spectral theory, making lasting contributions to mathematical research.

Research Interest

Dr. Hua Chen’s research interests lie at the intersection of partial differential equations, spectral asymptotics, and microlocal analysis. His work focuses on the theoretical and applied aspects of elliptic operators, Schrödinger equations, and singular and degenerate differential equations. He has made significant contributions to the understanding of reaction-diffusion systems, which have applications in physics, engineering, and mathematical biology. His research delves into eigenvalue problems, spectral geometry, and mathematical physics, providing new insights into fundamental mathematical structures. Dr. Chen’s studies on the behavior of solutions to PDEs under various boundary conditions have influenced modern approaches to differential operators and functional analysis. His interdisciplinary approach integrates pure and applied mathematics, bridging theoretical frameworks with real-world applications. His pioneering work in these areas has led to numerous high-impact publications, advancing the frontiers of mathematical knowledge and inspiring further research in differential equations and spectral analysis.

Awards and Honors

Dr. Hua Chen has received numerous accolades in recognition of his outstanding contributions to mathematics. He has been honored with prestigious national and international awards for his groundbreaking research in partial differential equations and spectral theory. Among his notable achievements, he has been a recipient of the National Science Fund for Distinguished Young Scholars in China, acknowledging his excellence in mathematical research. He has also been elected as a fellow of leading mathematical societies and has received distinguished professorships from renowned institutions. His research contributions have earned him invitations as a keynote speaker at major international awards, further highlighting his influence in the field. In addition to these honors, Dr. Chen has played a pivotal role in advancing mathematical sciences through his editorial and advisory positions in academic journals and research committees. His accolades reflect his dedication to advancing mathematical knowledge and his impact on the global research community.

Conclusion

Dr. Hua Chen is a highly accomplished mathematician whose contributions to partial differential equations, spectral theory, and microlocal analysis have significantly influenced the field. With a strong academic foundation from Wuhan University, he has built an illustrious career as a researcher, educator, and mentor. His extensive body of work, spanning fundamental theoretical developments and applied mathematical studies, has earned him global recognition. Dr. Chen’s leadership in research collaborations, journal editorial roles, and award organizations underscores his commitment to fostering mathematical innovation. His numerous awards and honors further affirm his excellence and influence in mathematical sciences. Through his dedication to advancing mathematical research, mentoring young scholars, and contributing to academic institutions, Dr. Chen has left a lasting impact on the global mathematical community. His outstanding career and remarkable contributions make him a deserving candidate for prestigious research awards and recognition in the field of mathematics.

Publications Top Noted

  • Liouville theorem for Lane-Emden equation of Baouendi-Grushin operators

    • Authors: Hua Chen, Xin Liao
    • Year: 2025
    • Citations: 0
    • Source: Journal of Differential Equations

  • GLOBAL CLASSICAL SOLUTIONS AND STABILIZATION FOR A CLASS OF COMPETITION MODELS WITH DENSITY-DEPENDENT MOTILITY

    • Authors: Hua Chen, Wenbin Lyu, Bo Mao
    • Year: 2025
    • Citations: 0
    • Source: Discrete and Continuous Dynamical Systems

  • Dirichlet problem for a class of nonlinear degenerate elliptic operators with critical growth and logarithmic perturbation

    • Authors: Hua Chen, Xin Liao, Ming Zhang
    • Year: 2024
    • Citations: 1
    • Source: Calculus of Variations and Partial Differential Equations

  • Multiplicity of solutions for the semilinear subelliptic Dirichlet problem

    • Authors: Hua Chen, Hongge Chen, Jinning Li, Xin Liao
    • Year: 2024
    • Citations: 1
    • Source: Science China Mathematics

  • Breast Cancer Prediction Based on Differential Privacy and Logistic Regression Optimization Model

    • Authors: Hua Chen, Nan Wang, Yuan Zhou, Mengdi Tang, Guangxing Cai
    • Year: 2023
    • Citations: 1
    • Source: Applied Sciences (Switzerland)

  • An Improved Density Peak Clustering Algorithm Based on Chebyshev Inequality and Differential Privacy

    • Authors: Hua Chen, Yuan Zhou, Kehui Mei, Mengdi Tang, Guangxing Cai
    • Year: 2023
    • Citations: 5
    • Source: Applied Sciences (Switzerland)

  • Auxiliary Diagnosis of Breast Cancer Based on Machine Learning and Hybrid Strategy

    • Authors: Hua Chen, Kehui Mei, Yuan Zhou, Nan Wang, Guangxing Cai
    • Year: 2023
    • Citations: 3
    • Source: IEEE Access

  • A Density Peaking Clustering Algorithm for Differential Privacy Preservation

    • Authors: Hua Chen, Kehui Mei, Yuan Zhou, Mengdi Tang, Guangxing Cai
    • Year: 2023
    • Citations: 6
    • Source: IEEE Access

  • A New Density Peak Clustering Algorithm With Adaptive Clustering Center Based on Differential Privacy

    • Authors: Hua Chen, Yuan Zhou, Kehui Mei, Nan Wang, Guangxing Cai
    • Year: 2023
    • Citations: 8
    • Source: IEEE Access

Mohammed Hussein | Applied Mathematics | Best Researcher Award

Posted on by Math Scientist

Prof. Mohammed Hussein | Applied Mathematics | Best Researcher Award

Academia at University of Baghdad, Iran

Dr. Mohammed Sabah Hussein is a distinguished Professor of Applied Mathematics at the University of Baghdad, College of Science, with a Ph.D. from the University of Leeds. With 18 years of teaching and research experience, his expertise spans inverse problems for heat equations, numerical analysis, fluid dynamics, and mathematical modeling. He has made significant contributions to academia, mentoring postgraduate students and serving in leadership roles, including Head of the Mathematics Department. Dr. Hussein has an impressive publication record in high-impact journals and actively participates in international research collaborations. His academic reputation is reflected in his H-index rankings across Google Scholar, Scopus, and Clarivate. As a member of several professional societies and editorial boards, he is dedicated to advancing applied mathematics. His technical proficiency in MATLAB, Mathematica, and LaTeX, coupled with his extensive research on solving complex mathematical problems, makes him a leading figure in his field.

Professional Profile 

Google Scholar
Scopus Profile
ORCID Profile

Education

Dr. Mohammed Sabah Hussein earned his Ph.D. in Applied Mathematics from the University of Leeds, where he specialized in inverse problems for heat equations and numerical analysis. Prior to that, he obtained his Master’s and Bachelor’s degrees in Mathematics from the University of Baghdad, demonstrating early excellence in mathematical modeling and computational techniques. His academic journey has been marked by a strong foundation in mathematical theories, which he later expanded through advanced research in applied mathematics and fluid dynamics. Throughout his education, Dr. Hussein actively engaged in research projects that enhanced his expertise in solving complex mathematical problems, particularly in heat transfer and differential equations. His exposure to international academic environments enriched his analytical skills and deepened his understanding of mathematical applications in real-world scenarios. His educational background continues to influence his teaching and research, enabling him to contribute significantly to mathematical sciences and mentor future scholars in applied mathematics.

Professional Experience

Dr. Mohammed Sabah Hussein is a Professor of Applied Mathematics at the University of Baghdad, College of Science, with 18 years of experience in teaching and research. He has held several academic leadership roles, including serving as Head of the Mathematics Department, where he played a crucial role in curriculum development and faculty mentoring. Over the years, he has supervised numerous postgraduate students, guiding them in advanced mathematical research. Dr. Hussein has collaborated with international institutions on cutting-edge research projects in applied mathematics, enhancing interdisciplinary studies. He has also served as a reviewer and editorial board member for prestigious mathematical journals, contributing to the peer-review process. His expertise in numerical methods, fluid dynamics, and inverse problems has led him to participate in global awards and workshops, where he shares his insights with the academic community. His commitment to research and education solidifies his standing as a leading mathematician.

Research Interest

Dr. Mohammed Sabah Hussein’s research focuses on inverse problems for heat equations, numerical analysis, fluid dynamics, and mathematical modeling. He specializes in solving complex differential equations that arise in real-world applications, particularly in heat transfer and fluid mechanics. His work extends to computational techniques using MATLAB and Mathematica, where he develops algorithms for accurate numerical solutions. Dr. Hussein is also interested in optimization methods and their applications in engineering and physical sciences. His research has contributed to advancements in thermal analysis and industrial processes, demonstrating the practical impact of applied mathematics. Additionally, he collaborates on interdisciplinary projects that integrate mathematics with physics and engineering, broadening the scope of mathematical applications. His publications in high-impact journals reflect his dedication to innovative mathematical research, and his continued exploration of numerical simulations and mathematical modeling ensures his contributions remain at the forefront of applied mathematics advancements.

Awards and Honors

Dr. Mohammed Sabah Hussein has received several prestigious awards and honors for his outstanding contributions to applied mathematics. His research excellence has been recognized with accolades from national and international academic institutions. He has been honored for his high-impact publications and has received grants for his work in mathematical modeling and numerical analysis. Dr. Hussein’s influence in academia is further demonstrated by his strong citation record and H-index rankings in Google Scholar, Scopus, and Clarivate. He has been invited as a keynote speaker at global awards and has received recognition for his mentorship of postgraduate students. His role in advancing mathematical sciences has been acknowledged through memberships in esteemed mathematical societies and editorial boards of reputed journals. These honors reflect his dedication to academic excellence and his influence on the broader mathematical research community.

Conclusion

Dr. Mohammed Sabah Hussein is a highly respected mathematician whose expertise in applied mathematics has significantly impacted academia and research. With a strong educational background and extensive professional experience, he has contributed to solving complex mathematical problems through advanced numerical analysis and modeling. His dedication to mentoring students, publishing high-impact research, and collaborating internationally highlights his commitment to the mathematical sciences. His awards and honors reflect his scholarly influence and contributions to mathematical research. As a professor, researcher, and mentor, Dr. Hussein continues to advance applied mathematics, ensuring its relevance in solving real-world challenges. His work in inverse problems, fluid dynamics, and computational methods cements his reputation as a leader in the field. Through his academic and research endeavors, he remains dedicated to pushing the boundaries of mathematical knowledge and inspiring future generations of mathematicians.

Publications Top Noted

1. Simultaneous determination of time-dependent coefficients in the heat equation

Authors: M. S. Hussein, D. Lesnic, M. I. Ivanchov
Year: 2014
Citations: 61
Source: Computers & Mathematics with Applications, 67(5), 1065-1091

2. An inverse problem of finding the time‐dependent diffusion coefficient from an integral condition

Authors: M. S. Hussein, D. Lesnic, M. I. Ismailov
Year: 2016
Citations: 49
Source: Mathematical Methods in the Applied Sciences, 39(5), 963-980

3. Reconstruction of time-dependent coefficients from heat moments

Authors: M. J. Huntul, D. Lesnic, M. S. Hussein
Year: 2017
Citations: 45
Source: Applied Mathematics and Computation, 301, 233-253

4. Simultaneous determination of time and space-dependent coefficients in a parabolic equation

Authors: M. S. Hussein, D. Lesnic
Year: 2016
Citations: 38
Source: Communications in Nonlinear Science and Numerical Simulation, 33, 194-217

5. Multiple time-dependent coefficient identification thermal problems with a free boundary

Authors: M. S. Hussein, D. Lesnic, M. I. Ivanchov, H. A. Snitko
Year: 2016
Citations: 37
Source: Applied Numerical Mathematics, 99, 24-50

6. Direct and inverse source problems for degenerate parabolic equations

Authors: M. S. Hussein, D. Lesnic, V. L. Kamynin, A. B. Kostin
Year: 2020
Citations: 35
Source: Journal of Inverse and Ill-Posed Problems, 28(3), 425-448

7. Simultaneous determination of time-dependent coefficients and heat source

Authors: M. S. Hussein, D. Lesnic
Year: 2016
Citations: 24
Source: International Journal for Computational Methods in Engineering Science and Mechanics

8. Identification of the time-dependent conductivity of an inhomogeneous diffusive material

Authors: M. S. Hussein, D. Lesnic
Year: 2015
Citations: 24
Source: Applied Mathematics and Computation, 269, 35-58

9. Determination of a time-dependent thermal diffusivity and free boundary in heat conduction

Authors: M. S. Hussein, D. Lesnic
Year: 2014
Citations: 23
Source: International Communications in Heat and Mass Transfer, 53, 154-163

10. Simultaneous Identification of Thermal Conductivity and Heat Source in the Heat Equation

Authors: M. J. Huntul, M. S. Hussein
Year: 2021
Citations: 20
Source: Iraqi Journal of Science, 1968-1978

11. A wavelet-based collocation technique to find the discontinuous heat source in inverse heat conduction problems

Authors: M. Ahsan, W. Lei, M. Ahmad, M. S. Hussein, Z. Uddin
Year: 2022
Citations: 16
Source: Physica Scripta, 97(12), 125208

12. Identification of a multi-dimensional space-dependent heat source from boundary data

Authors: M. S. Hussein, D. Lesnic, B. T. Johansson, A. Hazanee
Year: 2018
Citations: 16
Source: Applied Mathematical Modelling, 54, 202-220

13. Free boundary determination in nonlinear diffusion

Authors: M. S. Hussein, D. Lesnic, M. Ivanchov
Year: 2013
Citations: 16
Source: East Asian Journal on Applied Mathematics, 3(4), 295-310

14. Retrieval of Timewise Coefficients in the Heat Equation from Nonlocal Overdetermination Conditions

Authors: F. Anwer, M. S. Hussein
Year: 2022
Citations: 15
Source: Iraqi Journal of Science, 1184-1199

15. Numerical Solution to Recover Time-dependent Coefficient and Free Boundary from Nonlocal and Stefan Type Overdetermination Conditions in Heat Equation

Authors: M. Qassim, M. S. Hussein
Year: 2021
Citations: 15
Source: Iraqi Journal of Science, 62(3), 950-960

16. Determination of time-dependent coefficient in time fractional heat equation

Authors: Q. W. Ibraheem, M. S. Hussein
Year: 2023
Citations: 14
Source: Partial Differential Equations in Applied Mathematics, 7, 100492

17. Splitting the One-Dimensional Wave Equation, Part II: Additional Data are Given by an End Displacement Measurement

Authors: S. O. Hussein, M. S. Hussein
Year: 2021
Citations: 13
Source: Iraqi Journal of Science, 62(1), 233-239

18. Numerical Solution for Two-Sided Stefan Problem

Authors: M. S. Hussein, Z. Adil
Year: 2020
Citations: 12
Source: Iraqi Journal of Science, 61(2), 444-452

Maryam Alkandari | Analysis (Real, Complex, Functional) | Best Researcher Award

Posted on by Math Scientist

Dr. Maryam Alkandari | Analysis (Real, Complex, Functional) | Best Researcher Award

Associate Professor at Kuwait University, Kuwait

Dr. Maryam Mohammad Alkandari is an accomplished Associate Professor in the Department of Mathematics at Kuwait University, specializing in Algebraic Geometric Coding Theory and Fractional Calculus. She earned her Ph.D. from the University of London, Imperial College, and has made significant contributions to mathematical research through numerous high-impact publications. Her work spans diverse areas, including differential equations, operational methods in fractional calculus, and mathematical education. She has secured multiple research grants and received institutional recognition for her contributions. In addition to her theoretical research, Dr. Alkandari has explored interdisciplinary applications, particularly in autism education and mathematical pedagogy. She has collaborated with esteemed researchers and co-authored a book on fractional operators published by Springer. With a strong academic background, a broad research portfolio, and a commitment to advancing mathematical knowledge, Dr. Alkandari continues to make valuable contributions to the field, enhancing both theoretical understanding and practical applications.

Professional Profile 

Google Scholar

Education

Dr. Maryam Mohammad Alkandari earned her Ph.D. from the University of London, Imperial College, specializing in Algebraic Geometric Coding Theory. Her doctoral research focused on decoding partial geometric codes, contributing to the field of algebraic coding theory. This strong mathematical foundation equipped her with expertise in pure and applied mathematics, particularly in algebraic structures and their applications. Her academic journey reflects a commitment to advancing mathematical theories and methodologies. She has since built on her education by expanding her research into operational calculus and fractional differential equations. With a solid background in both theoretical and computational mathematics, Dr. Alkandari has successfully applied her knowledge across multiple disciplines, making notable contributions to the field.

Professional Experience

Dr. Alkandari is an Associate Professor in the Department of Mathematics at Kuwait University, where she has played a pivotal role in research, teaching, and mentorship. She has successfully led multiple research projects, collaborating with national and international scholars in algebraic coding theory, fractional calculus, and differential equations. In addition to her research, she has contributed significantly to mathematical education, exploring innovative teaching methodologies, including the use of GeoGebra and applied behavior analysis for autism education. Her academic career has been marked by a dedication to fostering mathematical understanding among students and researchers. Through her involvement in curriculum development and her supervision of research projects, she has influenced the next generation of mathematicians. Dr. Alkandari’s commitment to interdisciplinary applications of mathematics further highlights her professional contributions, bridging theoretical knowledge with real-world problems.

Research Interest

Dr. Alkandari’s research interests lie in Algebraic Geometric Coding Theory, Fractional Calculus, and Differential Equations. She has explored the development of operational methods in fractional calculus and their applications to solving differential equations. Her work also extends to mathematical modeling, particularly in constructing partial algebraic geometric codes and exploring oscillation properties of differential equations. She has made notable contributions to fuzzy statistical analysis, demonstrating her ability to integrate various mathematical fields. Additionally, she has engaged in interdisciplinary research, investigating the effectiveness of mathematical teaching methods for autistic children. Her diverse research interests reflect a broad and deep commitment to advancing mathematical knowledge while addressing real-world challenges. By continually expanding the scope of her studies, Dr. Alkandari remains at the forefront of mathematical innovation.

Awards and Honors

Dr. Alkandari has received multiple awards and honors in recognition of her outstanding research contributions. She was awarded research grants for her work on operational methods in fractional calculus and has been recognized by Kuwait University’s Research Sector for her impactful publications. Several of her research papers have received unfunded rewards, highlighting their significance in advancing mathematical theories. Her collaborations with esteemed researchers and contributions to high-impact journals further reinforce her reputation as a distinguished mathematician. Additionally, her co-authored book on transmutations of fractional operators, published by Springer, stands as a testament to her scholarly excellence. These accolades reflect her dedication to the field and her ability to conduct research that has both theoretical and applied significance. Through her numerous achievements, Dr. Alkandari continues to contribute meaningfully to the global mathematical community.

Conclusion

Dr. Maryam Mohammad Alkandari is a distinguished mathematician whose work spans algebraic coding theory, fractional calculus, and mathematical education. With a Ph.D. from Imperial College London, she has established herself as a leading researcher in her field, publishing extensively in high-impact journals and securing prestigious research grants. Her contributions extend beyond pure mathematics, incorporating interdisciplinary applications such as autism education and advanced computational methods. Through her role as an Associate Professor at Kuwait University, she has influenced many students and researchers, fostering a deeper understanding of complex mathematical concepts. Her numerous awards and recognitions highlight her excellence and dedication to the field. Dr. Alkandari’s ongoing research, international collaborations, and commitment to mathematical advancement continue to solidify her position as a respected figure in academia, making significant contributions to both theoretical and applied mathematics.

Publications Top Noted

  • Operational calculus for the general fractional derivatives of arbitrary order
    M. Al-Kandari, L.A.-M. Hanna, Y. Luchko
    Year: 2022 | Citations: 18

  • Operational method for solving fractional differential equations with the left-and right-hand sided Erdélyi-Kober fractional derivatives
    L.A.-M. Hanna, M. Al-Kandari, Y. Luchko
    Year: 2020 | Citations: 16

  • A fuzzy-statistical tolerance interval from residuals of crisp linear regression models
    M. Al-Kandari, K. Adjenughwure, K. Papadopoulos
    Year: 2020 | Citations: 13

  • Half-linear differential equations of fourth order: oscillation criteria of solutions
    O. Bazighifan, K.S. Al-Ghafri, M. Al-Kandari, F. Ghanim, F. Mofarreh
    Year: 2022 | Citations: 7

  • Delay differential equations of fourth-order: oscillation and asymptotic properties of solutions
    O. Bazighifan, M. Al-Kandari, K.S. Al-Ghafri, F. Ghanim, S. Askar, G.I. Oros
    Year: 2021 | Citations: 7

  • Calculus 1 college students’ concept of function
    A.H. Alajmi, M.M. Al-Kandari
    Year: 2022 | Citations: 5

  • New Criteria for Oscillation of Half-Linear Differential Equations with p-Laplacian-like Operators
    O. Bazighifan, F. Ghanim, J. Awrejcewicz, K.S. Al-Ghafri, M. Al-Kandari
    Year: 2021 | Citations: 4

  • Enhancing Kuwaiti Teachers’ Technology-Assisted Mathematics Teaching Practices
    M. Soliman, Z. Lavicza, T. Prodromou, M. Al-Kandari, T. Houghton
    Year: 2019 | Citations: 4

  • Some oscillation results for even-order differential equations with neutral term
    M. Al-Kandari, O. Bazighifan
    Year: 2021 | Citations: 3

  • On the Laplacian Energy of an Orbit Graph of Finite Groups
    V. Bhat, M. Singh, K. Sharma, M. Alkandari, L. Hanna
    Year: 2024

  • Nonlinear differential equations with neutral term: Asymptotic behavior of solutions
    M. Al-Kandari
    Year: 2024

  • Conditions for the Oscillation of Solutions to Neutral Differential Equations of Higher Order
    M. Al-Kandari
    Year: 2023

  • Enhanced criteria for detecting oscillations in neutral delay Emden-Fowler differential equations
    M. Al-Kandari
    Year: 2023

  • Completely Semiprime Ideals of Ore Extensions
    V.K. Bhat, M. Alkandari, L. Hanna, S.K. Sharma
    Year: 2023

  • Half-linear differential equations of fourth order: oscillation criteria of solutions
    B. Omar, K.S. Al-Ghafri, M. Al-Kandari, F. Ghanim, M. Fatemah
    Year: 2022

  • The Effectiveness of a Suggested Program in Developing College Students’ Ability to Write Proofs and their Beliefs Towards it
    A.H. Alajmi, M.M. Alkandari
    Year: 2022

  • On an extension of the Mikusiński type operational calculus for the Caputo fractional derivative
    M. Al-Kandari, L.A.-M. Hanna, Y. Luchko
    Year: 2021 | Citations: 3

  • A convolution family in the Dimovski sense for the composed Erdélyi-Kober fractional integrals
    M. Al-Kandari, L.A.-M. Hanna, Y.F. Luchko
    Year: 2019 | Citations: 3

  • Operational Calculus for the 1st Level General Fractional Derivatives and its Applications
    M. Alkandari, Y. Luchko
    Year: 2024 | Citations: 2

  • A new modification of an iterative method based on inverse polynomial for solving Cauchy problems
    A.H. Ali, O. Alabdali, M.T. Yaseen, M. Al-Kandari, O. Bazighifan
    Year: 2023 | Citations: 2