Raghavendran Prabakaran | Fractional Differential Equations | Best Researcher Award

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Dr. Raghavendran Prabakaran | Fractional Differential Equations | Best Researcher Award

Researcher | Vel Tech Rangarajan Dr. Sagunthala R\&D Institute of Science and Technology | India

Dr. Raghavendran Prabakaran is an emerging mathematician specializing in fractional differential equations, integral transforms, control theory, and their applications in artificial intelligence and cryptography. With over 60 research contributions, including SCI and Scopus-indexed journal papers, conference presentations, book chapters, and patents, his work demonstrates both theoretical depth and applied innovation. His research focuses on the development and analysis of mathematical models for complex systems, emphasizing existence, stability, and controllability results in fractional calculus. Through rigorous analytical approaches and novel transform methods, Dr. Raghavendran advances the understanding of fractional integro-differential systems, contributing to both pure and applied mathematics. His growing citation impact across Scopus, Web of Science, and Google Scholar reflects his rising influence in computational and applied mathematical research.

Profiles: Scopus | Orcid | Google Scholar 

Featured Publications

Raghavendran, P., Gunasekar, T., Balasundaram, H., Santra, S. S., & Baleanu, D. (2024). Solving fractional integro-differential equations by Aboodh transform. Journal of Mathematics and Computer Science, 34, —. Citation count: 34.

Gunasekar, T., Raghavendran, P., Santra, S. S., & Sajid, M. (2024). Existence and controllability results for neutral fractional Volterra–Fredholm integro-differential equations. Journal of Mathematics and Computer Science, 34(4), 361–380. Citation count: 33.

Gunasekar, T., Raghavendran, P., Santra, S. S., & Sajid, M. (2024). Analyzing existence, uniqueness, and stability of neutral fractional Volterra–Fredholm integro-differential equations. Journal of Mathematics and Computer Science, 33(4), 390–407. Citation count: 29.

Gunasekar, T., Raghavendran, P., Santra, S. S., Majumder, D., & Baleanu, D. (2024). Application of Laplace transform to solve fractional integro-differential equations. Journal of Mathematics and Computer Science, 33(3), 225–237. Citation count: 26.

Gunasekar, T., & Raghavendran, P. (2024). The Mohand transform approach to fractional integro-differential equations. Journal of Computational Analysis and Applications, 33(1), 358–371. Citation count: 25.

Ahmed Aberqi | Differential Equations | Best Researcher Award

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Prof. Ahmed Aberqi | Differential Equations | Best Researcher Award

Associate professor at Sidi Mohamed Ben Abdellah University/National School of Applied Sciences, Morocco

Prof. Ahmed Aberqi 🎓, a distinguished scholar at the National School of Applied Sciences of Fez, Morocco, specializes in nonlinear analysis, partial differential equations, optimal control, and fractional calculus. With a Ph.D. and habilitation in mathematics, his extensive academic portfolio includes impactful research publications 📚, guest editorships for renowned journals 📰, and leadership roles in applied sciences and emerging technologies 💡. As an educator, he has taught across diverse engineering and mathematics disciplines, nurturing future innovators 🧠. His contributions to AI and big data applications in smart systems underscore his commitment to interdisciplinary innovation 🤖📊. With expertise in high-dimensional statistics, operator theory, and control systems, Prof. Aberqi exemplifies excellence in mathematical research and applied science integration 🌐🔬.

Professional Profile

Education 🎓

Prof. Ahmed Aberqi holds a Ph.D. in Mathematics and a Habilitation à Diriger des Recherches (HDR), affirming his high-level academic competence in guiding doctoral research. He completed his studies at prestigious institutions, where he built a strong foundation in nonlinear analysis, partial differential equations, and control theory. His education reflects a blend of rigorous training, deep theoretical knowledge, and applied mathematical insight. He consistently pursues academic growth through workshops, seminars, and international collaborations 📖🌍. His academic journey has been shaped by a commitment to excellence and an enduring passion for learning. These qualifications position him as a respected educator and researcher in both engineering and mathematics domains 🧠📐.

Professional Experience 💼

Prof. Ahmed Aberqi serves as a professor at the National School of Applied Sciences, Fez (Morocco), where he has taught numerous undergraduate and postgraduate courses in engineering mathematics, systems theory, and optimization 🏫📊. With a robust background in academic leadership, he has contributed to curriculum development and research supervision. He has also held editorial roles in scientific journals, coordinated multidisciplinary research projects, and participated in international conferences 🌐✍️. His extensive experience extends to mentoring doctoral students and collaborating with institutions worldwide. Prof. Aberqi’s professional path is marked by intellectual rigor, impactful contributions, and a forward-looking vision of integrating mathematics with real-world challenges 🔬🤝.

Research Interest 🔍

Prof. Aberqi’s research spans nonlinear analysis, optimal control, partial differential equations, and fractional calculus 🔢📉. His recent work explores artificial intelligence, big data analytics, and smart systems, revealing a strong inclination towards interdisciplinary applications of mathematics 🤖📊. He is particularly interested in dynamic systems governed by fractional operators, mathematical modeling, and stability analysis. His studies in high-dimensional statistics and operator theory have practical implications in modern engineering and technological advancements. He actively contributes to solving real-world problems using advanced mathematical tools, making his research relevant to today’s rapidly evolving scientific landscape 🌐📈. Through his work, he bridges theoretical mathematics with practical innovations.

Awards and Honors 🏅

Prof. Ahmed Aberqi has received multiple accolades in recognition of his academic and research achievements. His distinguished contributions to applied mathematics and control theory have earned him invitations to serve as a keynote speaker and guest editor in renowned international journals and conferences 🎤📘. He is honored for his interdisciplinary research, especially for integrating AI and smart technology into mathematical frameworks. His excellence in mentorship and scholarly publishing further solidifies his reputation as a thought leader in applied sciences 🧠🌟. These honors underscore his enduring influence in the global academic community and his commitment to mathematical advancement and innovation.

Research Skills 🧪

Prof. Aberqi exhibits outstanding proficiency in mathematical modeling, fractional differential equations, stability theory, and optimal control 🧮🔁. His technical toolkit includes numerical simulations, system identification, AI-based optimization algorithms, and data-driven problem solving 🤖📊. He is skilled in using computational platforms to test theoretical outcomes and extend mathematical theories to practical systems. His ability to lead collaborative research, write scholarly articles, and edit scientific content for high-impact journals highlights his organizational and analytical skills. His cross-disciplinary fluency empowers him to integrate advanced mathematics into engineering, physics, and data science domains seamlessly ⚙️📐. His research skills reflect depth, versatility, and innovation.

Publications Top Notes

  • Title: Blow-up and global existence for a new class of parabolic p(x,⋅)-Kirchhoff equation involving double phase operator
    Authors: A. Aberqi, P.D. Nguyen, A. Ouaziz, M.A. Ragusa
    Year: 2025
    Citations: 3
    Source: Journal of Mathematical Analysis and Applications, Vol. 542(2), Article 128807

  • Title: Infinitely many solutions to a Kirchhoff-type equation involving logarithmic nonlinearity via Morse’s theory
    Authors: A. Ouaziz, A. Aberqi
    Year: 2024
    Citations: 3
    Source: Boletín de la Sociedad Matemática Mexicana, Vol. 30(1), Article 10

  • Title: Existence and L∞-estimates for non-uniformly elliptic equations with non-polynomial growths
    Authors: O. Benslimane, A. Aberqi, M. Elmassoudi
    Year: 2023
    Citations: 3
    Source: Filomat, Vol. 37(16), pp. 5509–5522

  • Title: Existence results for some nonlinear degenerate problems in the anisotropic spaces
    Authors: M. Boukhrij, B. Aharrouch, J. Bennouna, A. Aberqi
    Year: 2021
    Citations: 3
    Source: Boletim da Sociedade Paranaense de Matemática, Vol. 39, pp. 53–66

  • Title: Non-uniformly degenerated parabolic equations with L1-data
    Authors: A. Aberqi, J. Bennouna, M. Hammoumi
    Year: 2019
    Citations: 3
    Source: AIP Conference Proceedings, Vol. 2074(1)

  • Title: On some nonlinear hyperbolic p(x,t)-Laplacian equations
    Authors: T. Ahmedatt, A. Aberqi, A. Touzani, C. Yazough
    Year: 2018
    Citations: 3
    Source: Journal of Applied Analysis, Vol. 24(1), pp. 55–69

  • Title: Nonlinear elliptic equations with measure data in Orlicz spaces
    Authors: A. Aberqi, J. Bennouna, M. Elmassoudi
    Citations: 3

  • Title: Singular fractional double-phase problems with variable exponent via Morse’s theory
    Authors: A. Ouaziz, A. Aberqi
    Year: 2024
    Citations: 2
    Source: Filomat, Vol. 38(21), pp. 7579–7595

  • Title: On some doubly nonlinear system in inhomogeneous Orlicz spaces
    Authors: A. Aberqi, J. Bennouna, M. Elmassoudi
    Year: 2018
    Citations: 2
    Source: Electronic Journal of Mathematical Analysis and Applications, Vol. 6(1), pp. 156–173

  • Title: Infinitely Many Solutions to the Neumann Problem for Elliptic systems in Anisotropic Variable Exponent Sobolev Spaces
    Authors: A. Ahmed, M.S.B.E. Vall, A. Touzani, A. Benkirane
    Year: 2017
    Citations: 2
    Source: Marrocain Journal of Pure and Applied Analysis, Vol. 3, pp. 70–82

  • Title: Existence result for a class of doubly nonlinear parabolic systems
    Authors: A. Aberqi, J. Bennouna, H. Redwane
    Year: 2014
    Citations: 2
    Source: Applied Mathematics (Warsaw), pp. 1–11

  • Title: Approximate controllability of fractional differential systems with nonlocal conditions of order q∈(1, 2) in Banach spaces
    Authors: Z. Ech-chaffani, A. Aberqi, T. Karite
    Year: 2024
    Citations: 1

  • Title: Singular fractional double-phase problems with variable exponent via Morse’s theory
    Authors: A. Aberqi, A. Ouaziz
    Year: 2023
    Citations: 1
    Source: arXiv

  • Title: Stabilization of semilinear systems in Banach space
    Authors: A. El Alami, Z. Echchaffani, A. Aberqi
    Year: 2023
    Citations: 1
    Source: Honored Guests, p. 81

  • Title: Discrete solution for a nonlinear parabolic equation with diffusion terms in Musielak spaces
    Authors: A. Aberqi, M. Elmassoudi, M. Hammoumi
    Year: 2021
    Citations: 1
    Source: arXiv

  • Title: Sub-supersolution method for nonlinear elliptic equations with non-coercivity in divergent form in Orlicz spaces
    Authors: A. Ahmed, B. Jaouad, E. Mhamed
    Year: 2019
    Citations: 1
    Source: AIP Conference Proceedings, Vol. 2074(1)

  • Title: Controllability for impulsive neutral semilinear evolution systems with nonlocal conditions
    Authors: A. Aberqi, Z. Ech-chaffani, T. Karite
    Year: 2025
    Source: Journal of Dynamics and Games

  • Title: Blow-up and global existence of solutions for a new class of parabolic Kirchhoff equation involving nonlinearity logarithmic
    Authors: A. Aberqi, A. Ouaziz
    Year: 2025
    Source: Journal of Pseudo-Differential Operators and Applications, Vol. 16(1), pp. 1–33

  • Title: Investigation into double-phase elliptic problems with boundary conditions, incorporating a logarithmic convection term
    Authors: A. El Ouardani, A. Aberqi, O. Benslimane, M. El Massoudi
    Year: 2025
    Source: Journal of Pseudo-Differential Operators and Applications, Vol. 16(1), pp. 1–21

  • Title: On Neumann Systems with Singularity Applied in Quenching Phenomena in Musielak Spaces
    Authors: A. Elouardani, A. Aberqi, M. Elmassoudi
    Year: 2025
    Source: Nonlinear Dynamics & Systems Theory, Vol. 25(1)

  • Title: Double Phases Problems: Insight and new trends
    Authors: A. Aberqi
    Year: 2024
    Source: 5th International Conference on Applied Mathematics, p. 112

  • Title: Approximate Controllability of Fractional Differential Systems with Nonlocal Conditions of Order
    Authors: A. Aberqi, Z. Ech-chaffani, T. Karite
    Year: 2024
    Source: arXiv (arXiv:2411.10766)

  • Title: Fractional Caputo Operator and Takagi–Sugeno Fuzzy Modeling to Diabetes Analysis
    Authors: E. Mustapha, E.O. Abdellatif, E.M. Karim, A. Ahmed
    Year: 2024
    Source: Symmetry, Vol. 16(10), Article 1395

  • Title: Double Phase Problem with Singularity and Homogeneous Choquard Type Term
    Authors: O. Benslimane, A. Aberqi, M. Elmassoudi
    Year: 2024
    Source: Journal of Applied Analysis & Computation, Vol. 14(4), pp. 2109–2124

  • Title: Approximate controllability of fractional differential systems with nonlocal conditions of order q∈(1, 2) in Banach spaces
    Authors: Z. Ech‐chaffani, A. Aberqi, T. Karite
    Year: 2024
    Source: Asian Journal of Control

Conclusion 🧭

Prof. Ahmed Aberqi stands as a visionary academic whose multifaceted expertise in mathematics, engineering, and technology drives impactful innovation 🌟📚. His scholarly contributions, teaching excellence, and research leadership collectively elevate the field of applied mathematics. From fractional calculus to AI integration, his work reflects a deep commitment to solving modern challenges through mathematical insight 🔬🤝. With a strong international presence, numerous publications, and mentorship roles, he continues to shape the next generation of scientists and engineers. Prof. Aberqi exemplifies academic rigor, collaborative spirit, and intellectual curiosity, making him a key contributor to contemporary mathematical science and interdisciplinary progress 🌐🎓.

Shenzhou Zheng | Differential Equations | Best Researcher Award

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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! 🧗‍♂️🧾