Kutsenko Aleksandr Vladimirovich

Publications in Math-Net.Ru

1. Post-quantum cryptosystems: open problems and current solutions. Isogeny-based and code-based cryptosystems
   
   Diskretn. Anal. Issled. Oper., 31:1 (2024),  52–84
2. Characterization of generalized bent functions of algebraic degree $1$
   
   Prikl. Diskr. Mat. Suppl., 2024, no. 17,  37–40
3. Post-quantum cryptosystems: open problems and solutions. Lattice-based cryptosystems
   
   Diskretn. Anal. Issled. Oper., 30:4 (2023),  46–90
4. Mathematical problems and solutions of the Ninth International Olympiad in Cryptography NSUCRYPTO
   
   Prikl. Diskr. Mat., 2023, no. 62,  29–54
5. Main approaches in post-quantum cryptography: description, a comparative study
   
   Prikl. Diskr. Mat. Suppl., 2023, no. 16,  58–65
6. Gram matrices of bent functions and properties of subfunctions of quadratic self-dual bent functions
   
   Prikl. Diskr. Mat. Suppl., 2023, no. 16,  26–29
7. $\mathsf{XS}$-circuits' properties related to the guaranteed number of activations
   
   Prikl. Diskr. Mat. Suppl., 2022, no. 15,  62–66
8. Properties of subfunctions of self-dual bent functions
   
   Prikl. Diskr. Mat. Suppl., 2022, no. 15,  26–30
9. Algebraic cryptanalysis of round-reduced lightweight ciphers Simon and Speck
   
   Prikl. Diskr. Mat. Suppl., 2021, no. 14,  84–91
10. On some properties of self-dual generalized bent functions
    
    Prikl. Diskr. Mat. Suppl., 2021, no. 14,  42–45
11. Metrical properties of the set of bent functions in view of duality
    
    Prikl. Diskr. Mat., 2020, no. 49,  18–34
12. On metrical properties of the set of self-dual bent functions
    
    Prikl. Diskr. Mat. Suppl., 2020, no. 13,  21–27
13. Isometric mappings of the set of all Boolean functions into itself which preserve self-duality and the Rayleigh quotient
    
    Prikl. Diskr. Mat. Suppl., 2019, no. 12,  55–58
14. The Hamming distance spectrum between self-dual Maiorana–McFarland bent functions
    
    Diskretn. Anal. Issled. Oper., 25:1 (2018),  98–119
15. Mathematical methods in solutions of the problems presented at the Third International Students' Olympiad in Cryptography
    
    Prikl. Diskr. Mat., 2018, no. 40,  34–58
16. On some properties of self-dual bent functions
    
    Prikl. Diskr. Mat. Suppl., 2018, no. 11,  44–46
17. On some properties of known isometric mappings of the set of bent functions
    
    Prikl. Diskr. Mat. Suppl., 2017, no. 10,  43–44
18. On the set of values for Hamming distance between self-dual bent functions
    
    Prikl. Diskr. Mat. Suppl., 2016, no. 9,  29–30
19. On self dual bent functions
    
    Prikl. Diskr. Mat. Suppl., 2015, no. 8,  34–35


20. An overview of the Eight International Olympiad in Cryptography “Non-Stop University CRYPTO”
    
    Sib. Èlektron. Mat. Izv., 19:1 (2022),  9–37
21. The Seventh International Olympiad in Cryptography: problems and solutions
    
    Sib. Èlektron. Mat. Izv., 18:2 (2021),  4–29
22. On the Sixth International Olympiad in Cryptography NSUCRYPTO
    
    Diskretn. Anal. Issled. Oper., 27:4 (2020),  21–57