Dr.Fen Zhou , Best Researcher Award , China.
Dr.Fen Zhou is a dedicated mathematician specializing in differential geometry and functional analysis. He obtained his doctorate in Mathematics from Zhejiang Normal University, China, and previously studied at Yunnan Normal University. As a lecturer at Yunnan Normal University and Zhaotong College, he has taught courses like calculus, data structures, and nonlinear analysis. His research interests span Riemannian geometry, geometric analysis, and conformal geometry. With a strong academic foundation and an IELTS score of 7, he actively contributes to scientific research while shaping future mathematicians through his teaching. 
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Publication Profile
Education & ExperienceΒ 
Β Ph.D. in MathematicsΒ β Zhejiang Normal University, ChinaΒ
- Specialization: Functional Analysis, Nonlinear Functional Analysis
Β Mathematics AuditorΒ β Yunnan Normal University, ChinaΒ
- Focus: Differential Manifolds, Riemannian Geometry, Conformal Geometry, Complex Manifolds
Β LecturerΒ β Yunnan Normal University, ChinaΒ 
- Taught courses: Calculus, Scientific Research Guidance
Β LecturerΒ β Zhaotong College, Yunnan, ChinaΒ 
- Taught courses: Data Structures, Nonlinear Analysis, Differential Geometry, Geometric Analysis.
Suitability Summary
Dr. Fen Zhou, a distinguished researcher in the field of mathematics, has made remarkable contributions toΒ differential geometry, Riemannian geometry, and functional analysis. With aΒ doctoral degree in mathematics from Zhejiang Normal University, China, and extensive academic experience as a lecturer atΒ Yunnan Normal University and Zhaotong College, Dr. Zhou has significantly advanced research inΒ geometric analysis and nonlinear analysis. His groundbreaking work and dedication to mathematical sciences make him a highly deserving recipient of theΒ Best Researcher Award.
Professional Development 
Dr.Fen Zhou is continuously engaged in academic growth through research and teaching. As a lecturer at Yunnan Normal University and Zhaotong College, he fosters a deep understanding of mathematics among students while conducting research in differential and Riemannian geometry. His expertise in nonlinear analysis and geometric analysis contributes to advancements in mathematical theories. He regularly participates in academic discussions, conferences, and workshops to stay updated on the latest developments in his field. With a passion for higher education and an IELTS score of 7, he is committed to international collaborations and knowledge dissemination. 
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Research FocusΒ 
Dr.Fen Zhou research spans multiple areas of mathematics, with a strong emphasis on differential manifolds, Riemannian geometry, and the geometry of submanifolds. His work explores the fundamental properties of curved spaces, aiding advancements in geometric analysis and conformal geometry. He also delves intoΒ functional analysis and nonlinear functional analysis, contributing to mathematical structures and their applications. His research not only enhances theoretical understanding but also influences computational mathematics and physics. Through rigorous analysis and innovative approaches, he continues to explore the connections between abstract mathematical concepts and real-world applications.Β .
Awards & Honors 
Β IELTS Score: 7Β β Demonstrating strong English proficiencyΒ 
Β Outstanding Lecturer AwardΒ β Recognized for excellence in teachingΒ
Β Research Contribution AwardΒ β Acknowledged for contributions to differential geometry and functional analysisΒ
Β Best Paper AwardΒ β Honored for outstanding research publicationsΒ 
Β Academic Excellence AwardΒ β Recognition for high-impact research in mathematicsΒ .
Publication Top Notes
Β Infinitely Many SignβChanging Solutions for a SchrΓΆdinger Equation With Competing PotentialsΒ (2025) βΒ Mathematical Methods in the Applied SciencesΒ |Β DOI:Β 10.1002/mma.10727Β 
Β Synchronized and Segregated Vector Solutions for Nonlinear Fractional SchrΓΆdinger SystemsΒ (2022) βΒ Mathematical Methods in the Applied SciencesΒ |Β DOI:Β 10.1002/mma.8461Β
Β Some Remarks on Uniqueness of Positive Solutions to Kirchhoff Type EquationsΒ (2022) βΒ Applied Mathematics LettersΒ |Β DOI:Β 10.1016/j.aml.2021.107642Β
Β Existence of a Radial Solution to a 1-Laplacian Problem in RNΒ (2021) βΒ Applied Mathematics LettersΒ |Β DOI:Β 10.1016/j.aml.2021.107138Β 
Β Solutions for a Kirchhoff Type Problem With Critical Exponent in RNΒ (2021) βΒ Journal of Mathematical Analysis and ApplicationsΒ |Β DOI:Β 10.1016/j.jmaa.2020.124638Β .