Home > People > Faculty > Associate Professor > Content Associate Professor

Sihong Su

NameSihong Su

Titleassociate professor



Research Fieldinformation security


2010.09-2015.12, Ph.D. Southwest Jiaotong University

2003.09-2006.07, Master of Science, Henan University

1999.09-2003.07, Bachelor of Science, Henan University


2019.01- , Henan University, Associate professor

2009.07-2019.01,  Henan University, Lecturer

2006.07-2009.07, Henan University, Assistant professor

Selected publications

(1) S. Mesnager, S. Su*,On correlation immune Boolean functions with minimum Hamming weight power of $2$,IEEE Transactions on Information Theory, accepted, 2021.

(2) S. Mesnager, S. Su*, On constructions of weightwise perfectly balanced Boolean functions, Cryptography and Communications, accepted, DOI:10.1007/s12095-021-00481-3, 2021.

(3) S. Su*, The lower bound of the weightwise nonlinearity profile of a class of weightwise perfectly balanced functions, Discrete Applied Mathematics, vol. 297, pp. 60-70, 2021.

(4) S. Mesnager, S. Su*, and H. Zhang, A construction method of balanced rotation symmetric Boolean functions on arbitrary even number of variables with optimal algebraic immunity, Designs, Codes and Cryptography, vol. 89, no. 1, pp. 1-17, 2021.

(5) S. Su*, Systematic Methods of Constructing Bent Functions and 2-rotation Symmetric Bent Functions, IEEE Transactions on Information Theory, vol. 66, no. 5, pp. 3277-3291, 2020.

(6) J. Li, S. Su*, Construction of weightwise perfectly balanced Boolean functions with high weightwise nonlinearity, Discrete Applied Mathematics, vol. 279, pp. 218-227, 2020.

(7) H. Zhang, S. Su*, A New Construction of Rotation Symmetric Boolean Functions with Optimal Algebraic Immunity and Higher Nonlinearity, Discrete Applied Mathematics, vol. 262, pp. 13-28, 2019.

(8) S. Su*, X. Tang, Systematic Constructions of Rotation Symmetric Bent Functions, 2-Rotation Symmetric Bent Functions, and Bent Idempotent, IEEE Transactions on Information Theory, Vol. 63, no. 7, pp. 4658-4667, 2017.

(9) S. Su*, X. Tang, X. Zeng, A systematic method of constructing Boolean functions with optimal algebraic immunity based on the generator matrix of the Reed-Muller code, Designs, Codes and Cryptography, vol. 72. No, 3, pp. 653-673, 2014.

(10) S. Su*, X. Tang, Construction of rotation symmetric Boolean functions with optimal algebraic immunity and high nonlinearity, Designs, Codes and Cryptography, vol. 71, no. 2, pp. 183-199, 2014.(*:corresponding author)

Research Funding

1. Research on the related problems of rotation symmetric bent functionsNational Natural Science Foundation of China(61502147)2016.01-2018.12

2. Homomorphic encryption and its application in blockchainKey Scientific Research Project of Colleges and Universities in Henan Province (21A413003)2021.01—2022.12


Boolean functionsalgebraic coding and cryptographyModern AlgebraMathematical Modeling Advanced MathematicsLinear AlgebraProbability theory and Mathematical statistics


PreNews: Hengcai Tang

NextNews: Zhanjiang Zhi