Kozlitin Oleg Alekseevich

Publications in Math-Net.Ru

1. Remote voting protocols. II
   
   Mat. Vopr. Kriptogr., 15:3 (2024),  83–100
2. Remote voting protocols. I
   
   Mat. Vopr. Kriptogr., 14:4 (2023),  89–110
3. Periodical properties of multidimensional polynomial generator over Galois ring. IV
   
   Mat. Vopr. Kriptogr., 13:4 (2022),  69–95
4. Periodical properties of multidimensional polynomial transformations of Galois – Eisenstein ring
   
   Mat. Vopr. Kriptogr., 13:1 (2022),  69–99
5. Periodical properties of multidimensional polynomial generator over Galois ring. III
   
   Mat. Vopr. Kriptogr., 11:4 (2020),  49–76
6. Periodical properties of multidimensional polynomial generator over Galois ring. II
   
   Mat. Vopr. Kriptogr., 11:1 (2020),  63–100
7. Pseudorandom sequence generators based on shift registers over finite chain rings
   
   Mat. Vopr. Kriptogr., 10:3 (2019),  49–65
8. Periodic properties of multidimensional polynomial generator over the Galois ring. I
   
   Mat. Vopr. Kriptogr., 9:3 (2018),  61–98
9. Estimate of the maximal cycle length in the graph of polynomial transformation of Galois–Eisenstein ring
   
   Diskr. Mat., 29:4 (2017),  41–58
10. On periodic properties of polylinear shift registers
    
    Diskr. Mat., 29:1 (2017),  27–50
11. Probabilistic linear relations in binary recurring sequences
    
    Mat. Vopr. Kriptogr., 8:3 (2017),  57–84
12. On the structure of graph of polynomial transformation of the Galois ring
    
    Mat. Vopr. Kriptogr., 6:3 (2015),  47–73
13. Constructing pseudorandom sequences by means of $2$-linear shift register
    
    Mat. Vopr. Kriptogr., 5:1 (2014),  39–72
14. Cyclic structure of a polynomial generator over the Galois ring
    
    Mat. Vopr. Kriptogr., 4:1 (2013),  27–57
15. $2$-linear shift register over the Galois ring of even characteristic
    
    Mat. Vopr. Kriptogr., 3:2 (2012),  27–61
16. Parallel decomposition of nonautonomous 2-linear shift registers
    
    Mat. Vopr. Kriptogr., 2:3 (2011),  5–29
17. Properties of the output sequence of a simplest 2-linear shift register over $\mathbf Z_{2^n}$
    
    Diskr. Mat., 19:4 (2007),  70–96
18. Periodic properties of a simplest 2-linear shift register
    
    Diskr. Mat., 19:3 (2007),  51–78
19. Polynomial transformations of a GEO-ring of prime characteristic
    
    Diskr. Mat., 16:3 (2004),  105–117


20. To the memory of Igor Aleksandrovich Kruglov
    
    Mat. Vopr. Kriptogr., 11:4 (2020),  5–6