Prof. Bin Ge | Nonlinear Analysis | Best Researcher Award
Harbin Engineering University | China
Bin Ge received the PhD degree in mathematics from the Harbin Institute of Technology in Harbin, China, and pursued his postdoctoral research at the Harbin Engineering University where he later continued his academic career as an Assistant Professor, establishing himself as a dedicated scholar in the field of nonlinear analysis and its multifaceted applications in partial differential equations, nonlinear control theory, and the design and optimization of advanced engineering systems, his research spanning fundamental theoretical contributions as well as applied directions, particularly focusing on mathematical modeling, control techniques, and innovative problem-solving strategies that bridge pure mathematics with complex engineering challenges, his interests encompassing the exploration of nonlinear dynamics, stability analysis, and the development of robust control methods that have significant impact on the performance and reliability of technological systems, with a special emphasis on their implementation in automotive powertrain systems where efficiency, precision, and adaptability are critical, as well as in unmanned aerial vehicles where autonomous navigation, stability, and control require advanced nonlinear control strategies, his work representing a vital intersection between mathematical theory and engineering practice, contributing to both academic advancement and industrial innovation, his record of over eight hundred citations across more than one hundred published documents and an h-index reflecting consistent scholarly influence demonstrating the recognition his work has earned in the research community, his career underscoring a commitment to advancing knowledge in nonlinear analysis and control, expanding its reach into practical domains, and fostering new directions in applied mathematics and engineering systems research, with his contributions continuing to strengthen the integration of mathematics into emerging technologies and shaping the future landscape of control theory and its applications across diverse and evolving scientific and engineering fields.
Featured Publications:
-
Author, A., Author, B., & Author, C. (2025). Global existence and blow-up of point-wise solutions to a logarithmic nonlinear heat equation on locally finite graphs. Journal of Mathematical Physics.
-
Author, A., Author, B., & Author, C. (2025). Quasilinear double phase problems on the entire space RN\mathbb{R}^NRN. Journal of Applied Analysis and Computation.
-
Author, A. (2025). Campanato type estimates for the multi-phase problems with irregular obstacles. Mediterranean Journal of Mathematics.
-
Author, A., Author, B., & Author, C. (2025). Effective dynamics for a class of stochastic parabolic equation driven by Lévy noise with a fast oscillation. Mathematical Methods in the Applied Sciences.
-
Author, A., Author, B., Author, C., & Author, D. (2025). Study on the diffusion fractional m-Laplacian with singular potential term. Fractional Calculus and Applied Analysis.
-
Author, A., Author, B., & Author, C. (2025). Multiplicity of solutions for a class of new p(x)p(x)p(x)-Kirchhoff problem. Bulletin des Sciences Mathématiques.
-
Author, A., Author, B., & Author, C. (2025). Infinitely many low- and high-energy solutions for double-phase problems with variable exponent. Mathematische Nachrichten.
-
Author, A. (2025). On a class of fractional p(⋅,⋅)p(·,·)p(⋅,⋅)-Laplacian equations in the whole space. Discrete and Continuous Dynamical Systems – Series S.
-
Author, A., Author, B., Author, C., Author, D., & Author, E. (2025). Existence of solutions for the fractional p&qp \& qp&q-Laplacian equation with nonlocal Choquard reaction. AIMS Mathematics.
-
Author, A., Author, B., Author, C., & Author, D. (2024). Infinitely many positive solutions for a double phase problems involving the double phase operator. Topological Methods in Nonlinear Analysis.