Wuhan University | China
Dr. Jia Zheng is a dedicated and rising mathematician currently serving as a Postdoctoral Fellow at Wuhan University, China. With a strong foundation in mathematical theories and a focused interest in Fourier Analysis, Dr. Zheng has consistently demonstrated academic excellence and research innovation throughout his journey. His contributions to self-affine tilings, exponential orthogonal functions, and spectral theory of fractal measures position him as a prominent young researcher in pure mathematics.
Professional profile👤
Scopus
Strengths for the Awards✨
Dr. Jia Zheng has shown exceptional promise and achievement in the field of mathematics, particularly within Fourier analysis, real analysis, measure theory, and fractal geometry. With a total of 6 peer-reviewed journal publications (including reputed journals such as Banach Journal of Mathematical Analysis, Bulletin of the Malaysian Mathematical Sciences Society, and Journal of Geometric Analysis), and 3 preprints, Dr. Zheng has made substantial contributions to the understanding of spectrality, tiling theory, and self-affine structures. His ability to collaborate across projects, evident in multiple co-authored works, demonstrates both depth and breadth of research competence.
🎓 Education
Dr. Zheng began his academic journey with a B.Sc. in Mathematics and Applied Mathematics from Gannan Normal University (2013–2017). He further deepened his mathematical foundation by pursuing an M.Sc. at Hunan Normal University (2017–2020), supported by the Hunan Provincial Innovation Foundation. His Ph.D., completed at Central China Normal University (2020–2024) under the supervision of Prof. Xiaoye Fu, focused on advanced areas like Fourier Analysis, Measure Theory, and Frame Theory. In August 2024, he commenced his postdoctoral research at Wuhan University, mentored by Prof. Lingmin Liao, concentrating on Fourier Analysis in p-adic fields.
💼 Experience
Dr. Zheng has participated in several impactful academic projects, including his postgraduate research on the spectrality of fractal measures, which resulted in two peer-reviewed papers. As a Teaching Assistant at CCNU (2021–2022), he significantly improved student performance and engagement in real-variable theory courses. His work extended beyond teaching, involving curriculum refinement and in-depth tutorial sessions. His academic involvement is also evident through participation in numerous national and international conferences.
🔬 Research Interests On Mathematics
Dr. Zheng’s primary research interests lie in Fourier Analysis, Real Analysis, and the spectral theory of fractals and self-affine measures. He has extensively worked on orthogonal exponential families, tiling, and wavelet sets in various mathematical structures such as Cantor sets and Sierpinski gaskets. His passion for pure mathematics and fractal geometry drives his continuous exploration into complex mathematical phenomena.
🏆 Awards and Honors
Dr. Zheng’s excellence has been recognized through multiple accolades. He received the Second-Class Scholarship at Central China Normal University (2020–2024) and First-Class Scholarship at Hunan Normal University (2017–2020). He also earned honors in national-level competitions, including a Third Prize in the “Huawei Cup” and an Honorable Mention in the Interdisciplinary Contest in Modeling. His undergraduate years were marked by leadership and academic distinction at Gannan Normal University.
📚 Publications
Dr. Zheng has contributed to several peer-reviewed journals, with notable citations:
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Matrices over finite fields applied in exponential orthogonal family
Banach Journal of Mathematical Analysis, 19, 44 (2025). Cited by 1+ articles
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Spectrality of a class of Cantor-dust type self-affine tiles
Bulletin of the Malaysian Mathematical Sciences Society, 48, 98 (2025). Cited by 1+ articles
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Tiling and spectrality for generalized Sierpinski self-affine sets
Journal of Geometric Analysis, 34, 5 (2024). Cited by 2+ articles
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Some results on planar self-affine measures with collinear digit sets
Complex Analysis and Operator Theory, 17, 123 (2023). Cited by 3+ articles
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On the orthogonal exponential functions of a class of planar self-affine measures
Journal of Mathematical Analysis and Applications, 485 (2020), 123790. Cited by 4+ articles
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The cardinality of orthogonal exponential functions on the spatial Sierpinski gasket
Fractals, 27 (2019), 1950056. Cited by 5+ articles
🔚 Conclusion
Dr. Jia Zheng’s academic trajectory, from undergraduate excellence to impactful postdoctoral research, illustrates a passionate commitment to the field of mathematics. His scholarly outputs, including peer-reviewed publications, active academic engagements, and prestigious awards, make him a deserving nominee for any research recognition or award. His work not only contributes to the theoretical richness of mathematical sciences but also inspires a new generation of researchers in fractals and Fourier analysis. 🌟
