Cuilihong头像

Cuilihong

Professor

Research direction: Wavelets, Machine Learning Algorithms, and Their Applications

Education: PhD

  • Department: Mathematics
  • ORCID:
  • DBLP:

10 Access

  • Email: cuilh@mail.buct.edu.cn
  • Office : Mathematics and Physics Building 323

Introduction

Professor

PhD supervisor

The director of a national first-class cours(Linear Algebra

Beijing Famous Teacher in Higher Education

Course Director for High-Quality Undergraduate Programs in Beijing

Awarded honors for a Model Ideological and Political Education Course, recognized as a Famous Teacher, and appointed as the Leader of an Excellent Team in Beijing.

Awarded the First Prize in the Beijing Teaching Achievement Awards.

The research area focuses on wavelet analysis theoretical algorithms and their applications

Education

Work Experience

Social Position

Social Activities

Research

The research area focuses on wavelet analysis theoretical algorithms and their applications, as well as machine learning algorithms and their applications in materials science and medicine.

Teaching

Linear Algebra

Advanced Mathematics

Matrix Theory and Its Applications

Wavelet Analysis and Its Applications

Comprehensive Practicum

Postgraduates

Funding

Vertical Project

Horizontal Project

Publications

[1] L.Cui*, Z. Cheng, A Method of Construction for Biorthogonal Multiwavelets System with 2rMultiplicity. Applied Mathematics and Computation, 2005, 167(2): 901—908.

[2] Lihong Cui, Some properties and construction of multiwavelets related to different symmetric centers , Mathematics and Computers in Simulation, 2005, 70 ( 2 ): 69—89.

[3] Lihong Cui, Zhengxing Cheng, A Method of Construction for Biorthogonal Multiwavelets System with 2rMultiplicity. Applied Mathematics and Computation, 2005, 167(2): 901—908.

[4] Lihong Cui, Qixiang Yang, On the generalized Morrey spaces, Siberian Mathematical Journal,  2005 46 (1): 133—141.

[5]Lihong Cui, Weixing Wang, Jiming Zhang, On a family of biorthogonal armlets with prescribed properties, Applied Mathematics and Computation, 2007, 193 (1): 36—65.

[6] Lihong Cui, Ruixue Cong, Construction for a class of interpolation multiscaling functions with dilation factor , Computers and Mathematics with Applications, 2008, 56(11): 2948—2956.

[7] Lihong Cui, TongbinZhang, M-Band orthogonal vector-valued multiwavelets for vector-valued signalsJournal of Applied Mathematics and Computing, 2008, 28 (1-2), 165—184

[8] L. Cui*B. ZhaiExistence and design of biorthogonal matrix-valued waveletsNonlinear Analysis Real World Applications, 2009, 10(5): 2679—2687.

[9] L. Cui*, W.Wang, Odd-length Armlets with Flipping Property and Its Application in Image

Compression, Expert Systems with Applications, 2009, 36(6): 10025—10029.

[10] L. Cui *, W. Li, Adaptive Multiwavelet-Based Watermarking Through JPW masking, IEEE Trans on Image Processing2011, 20(4): 1047-1060.

[11] J. SunY. HuangL. Cui*, Parameterizations of masks for 3-band tight wavelet frames by symmetric extension of polyphase matrixAppl. Math.Comput.,225(2013)461–474.

[12] L Cui, Z Wang, Y Cen, X Li  and J SunAn Extension of the Interscale SURE-LET Approach for Image Denoising, International Journal of Advanced Robotic Systems2014,11:9.

[13] Janjun SunWeixing. WangLina Zhao, Lihong Cui*, Biorthogonal balanced multiwavelets with high armlets order and their application in image denoising, Mathematics and Computers in Simulation, 2015, 111: 48—62.

[14] Youquan Wang, Lihong Cui* and eta.l, Construction and solution of an adaptive image-restoration model for removing blur and mixed noise, J. Electron. Imag. 25(2), 023013 (2016).

[15] L.Cui*, N. Zhu and etalExistence of Matrix-Valued Multiresolution Analysis-Based Matrix-Valued Tight Wavelet Frames, Numerical Functional Analysis and Optimization, 37(9), 1089-1106, 2016.

[16] Lihong Cui*, Qiaoyun Wu, Dual Wavelet Frame Transforms on Manifolds and GraphsJournal of Mathematics Volume 2019, Article ID 1637623, 12 pages,

[17] L.Cui*, X. Li and J. Sun, Construction of uniformly symmetric bi-frames based on multiresolution template algorithmInternational Journal Of Computer Mathematics 2019, Vol. 96, NO. 6, 1192–1216

[18] L. Cui*, Q. Zhang and etalMultiwavelet density estimation for biased dataCommunications in statistics - simulation and computation. 2021, VOL. 50, NO. 1, 234–253.

[19]Y. Huang, Q. Chen Z. Zhang, K. Gao, A. Hu, Y. Dong, J. Liu, L. Cui*. A Machine Learning Framework to Predict the Tensile Stress of Natural Rubber: Based on Molecular Dynamics Simulation Data, .Polymers 2022, 14, 1897.

[20] A. Hu, Y. Huang, Q. Chen, W. Huang, X.i Wu, L Cui*, Y. Dong, and J. Liu., Glass transition of Amorphous Polymeric Materials Informed by Machine LearningAPL Mach. Learn.1, 026111 (2023)

[21]Qionghai ChenZhanjie LiuYongdi HuangAnwen HuWanhui HuangLiqun ZhangLihong Cui*Jun Liu,  Predicting Natural Rubber Crystallinity by a Novel Machine Learning Algorithm Based on Molecular Dynamics Simulation DataLangmuir 2023, 39, 1708817099.


Awards


Awarded the First Prize in the Beijing Teaching Achievement Awards(2022).

Awarded the Title of Famous Teacher in Higher Education in Beijing(2021)

Awarded the Excellent Lecturer for Public Courses in Beijing(2019)

Awarded honors for a Model Ideological and Political Education Course, recognized as a Famous Teacher, and appointed as the Leader of an Excellent Team in Beijing(2022)

Awarded the Second Prize in the Beijing Teaching Achievement Awards(2017).



Patent

Honor Reward

Admissions Information