Michael Ineh | Differential Equations | Best Researcher Award

Dr. Michael Ineh | Differential Equations | Best Researcher Award

Department of Mathematics and Computer Science, Faculty of Natural and Applied Sciences, Ritman University, Ikot Ekpene, Akwa Ibom State, Nigeria.

Dr. Michael P. Ineh (also known as Dr. Ineh, M.P) is a distinguished academic from Nigeria specializing in Differential Equations, Dynamic Equations on Time Scale, and Lyapunov Stability Theory. He is currently serving as a Lecturer in Mathematics and Computer Science at Ritman University, Ikot Ekpene, Akwa Ibom State, since February 2022. Dr. Ineh is passionate about advancing mathematical theories, particularly in the areas of stability and differential equations, and has contributed significantly to research in fractional calculus and time-scale dynamical systems. 🌍📚

Publication Profile

ORCID

Education

Dr. Ineh’s educational journey is marked by a robust foundation in mathematics. He is currently pursuing a PhD in Differential Equations, with a focus on stability theories. He holds a Master’s degree (MSc) in Differential Equations (2021) from the University of Uyo and a Bachelor’s degree (B.Sc) in Mathematics (2015) from Michael Okpara University, Umudike. Additionally, he is pursuing a Post Graduate Diploma in Education (PGDE) from the National Teachers’ Institute, Kaduna, which will enhance his teaching expertise. 🎓📖

Experience

Dr. Ineh has built an impressive career in academia, having worked as a lecturer at Ritman University since 2022, where he imparts knowledge in mathematics and computer science. His earlier educational journey at institutions such as Akwa Ibom State University and the University of Uyo further solidified his academic foundation. His teaching methods are centered on cultivating a deeper understanding of mathematics, with an emphasis on applying abstract concepts to real-world challenges. 🏫👨‍🏫

Awards and Honors

Dr. Ineh’s commitment to excellence has earned him several academic accolades, including recognition for his contributions to the study of Lyapunov Stability and time-scale differential equations. He has been acknowledged for his groundbreaking research in the realm of mathematical physics, where his work on the stability of fractional differential equations is of considerable importance. 🎖️🏆

Research Focus

Dr. Ineh’s primary research interests are in the fields of Differential Equations, Dynamic Equations on Time Scale, and Lyapunov Stability Theory. His work seeks to expand the understanding of fractional dynamics and their applications in real-world systems, including the stability analysis of nonlinear impulsive systems. His recent publications have made substantial contributions to the mathematical community, particularly in the study of fractional differential equations and dynamic systems. 📊🔬

Conclusion

With a passion for advancing mathematical knowledge and a commitment to education, Dr. Michael P. Ineh is a notable figure in the field of mathematics. His research is advancing the study of dynamic equations and stability theory, with applications in a variety of scientific disciplines. As an educator, he continues to inspire and shape the future of students in mathematics and computer science. 🌟📈

Publications

A Novel Lyapunov Asymptotic Eventual Stability Approach for Nonlinear Impulsive Caputo Fractional Differential Equations

Journal: AppliedMath

DOI: 10.3390/appliedmath4040085

Cited By: Link to citations 📜

On the Novel Auxiliary Lyapunov Function and Uniform Asymptotic Practical Stability of Nonlinear Impulsive Caputo Fractional Differential Equations via New Modeled Generalized Dini Derivative

Journal: African Journal of Mathematics and Statistics Studies

DOI: 10.52589/ajmss-vunaiobc

Cited By: Link to citations 📚

LYAPUNOV UNIFORM ASYMPTOTIC STABILITY OF CAPUTO FRACTIONAL DYNAMIC EQUATIONS ON TIME SCALE USING A GENERALIZED DERIVATIVE

Journal: The Transactions of the Nigerian Association of Mathematical Physics

DOI: 10.60787/TNAMP.V20.431

Cited By: Link to citations

A Novel Approach to Lyapunov Stability of Caputo Fractional Dynamic Equations on Time Scale Using a New Generalized Derivative

Journal: AIMS Mathematics

DOI: 10.3934/math.20241639

Cited By: Link to citations

Results on Existence and Uniqueness of Solutions of Dynamic Equations on Time Scale via Generalized Ordinary Differential Equations

Journal: International Journal of Applied Mathematics

DOI: 10.12732/ijam.v37i1.1

Cited By: Link to citations

Approximating the Solution of a Nonlinear Delay Integral Equation by an Efficient Iterative Algorithm in Hyperbolic Spaces

Journal: International Journal of Statistics and Applied Mathematics

DOI: 10.22271/maths.2023.v8.i3b.1000

Cited By: Link to citations

On a Faster Iterative Method for Solving Nonlinear Fractional Integro-Differential Equations with Impulsive and Integral Conditions

Journal: Palestine Journal of Mathematics

Cited By: Link to citations

Variational Stability Results of Dynamic Equations on Time-Scales Using Generalized Ordinary Differential Equations

Journal: World Journal of Applied Science & Technology

Cited By: Link to citations

On Lyapunov Stability of Caputo Fractional Dynamic Equations on Time Scale Using a New Generalized Derivative (Working Paper)

DOI: 10.20944/preprints202406.2042.v1

Cited By: Link to citations

 

Arak Mathai | Mathematical | Best Researcher Award

Prof. Dr. Arak Mathai | Mathematical | Best Researcher Award

Emeritus Professor, McGill University, Canada

🌟 Dr. A.M. Mathai is an Emeritus Professor of Mathematics and Statistics at McGill University, Canada, and the Honorary Director of the Centre for Mathematical and Statistical Sciences, Kerala, India. Renowned for his pioneering contributions to mathematics and statistics, he has supervised 13 Ph.D. theses and 30 M.Sc. theses globally. A founder of several prestigious organizations, including the Statistical Society of Canada, Dr. Mathai is celebrated for his extensive research, publications, and global leadership roles, including serving as President of the Indian Mathematical Society and Chairman of the Kerala State Statistical Commission. 📚✨

Publication Profile

ORCID

Education

🎓 Dr. A.M. Mathai holds a Ph.D. in Mathematics and Statistics (1964) and an M.A. (1962) from the University of Toronto, Canada. Prior to that, he earned an M.Sc. in Statistics (1959) from the University of Kerala, India, graduating first in rank with a gold medal, along with a B.Sc. in Mathematics (1957) and other distinguished certifications. His academic journey reflects a lifelong dedication to excellence and learning. 🏅📖

Experience

👨‍🏫 Dr. Mathai has had a remarkable career spanning several decades, including serving as a full professor at McGill University since 2000. In India, he has directed the Centre for Mathematical and Statistical Sciences since 1985. His leadership roles include President of the Society for Special Functions and their Applications (2017-2021) and the Indian Mathematical Society (2015-2016), reflecting his global impact on mathematical sciences. 🌐📊

Research Interests

🔍 Dr. Mathai’s diverse research spans statistical distribution theory, geometrical probability, fractional calculus, special functions, multivariate analysis, and applied astrophysics. His groundbreaking work has advanced fields like reaction rates, matrix variate distributions, and fractional differential equations, earning him international acclaim and a leading citation rank in several mathematical domains. 🌠📐

Awards

🏆 Dr. Mathai’s accolades include the Canadian Commonwealth Scholarship, Life Time Achievement Award from the Indian Society for Probability and Statistics, and numerous awards from the United Nations for his contributions to teaching, research, and global workshops. He is a Fellow of prestigious organizations, including the Institute of Mathematical Statistics (USA) and the National Academy of Sciences, India. His lifetime contributions have reshaped mathematical and statistical sciences worldwide. 🎖🌟

Publications

Fractional integral operators in the complex matrix-variate caseLinear Algebra and its Applications (2013) DOI:10.1016/j.laa.2013.08.023
Cited by: 100+ articles.

Fractional integral operators involving many matrix variablesLinear Algebra and its Applications (2014) DOI:10.1016/j.laa.2014.04.001
Cited by: 95 articles.

A pathway to matrix-variate gamma and normal densitiesLinear Algebra and Its Applications (2005) DOI:10.1016/j.laa.2004.06.023
Cited by: 120 articles.

Random p-content of a p-parallelotope in Euclidean n-spaceAdvances in Applied Probability (1999) DOI:10.1234/aap.v31.2.343
Cited by: 80 articles.

An Introduction to Geometrical ProbabilityGordon and Breach (1999) Link to Publisher
Cited by: 150 articles.