V.S. Kugurakov* , A.F. Gainutdinova** , V.T. Dubrovin***
Kazan Federal University, Kazan, 420008 Russia
E-mail: *Vladimir.Kugurakov@kpfu.ru, **aida.ksu@gmail.com, ***yacheslav.Dubrovin@kpfu.ru
Received March 11, 2019

Full text PDF

DOI: 10.26907/2541-7746.2019.2.292-300

For citation: Kugurakov V.S., Gainutdinova A.F., Dubrovin V.T. About permutations on the sets of tuples from elements of the finite field. Uchenye Zapiski Kazanskogo Universiteta. Seriya Fiziko-Matematicheskie Nauki, 2019, vol. 161, no. 2, pp. 292–300. doi: 10.26907/2541-7746.2019.2.292-300. (In Russian)


Abstract

The following problem was considered: let S = S1× S2×…× Sm be the Cartesian product of subsets Si that are subgroups of the multiplicative group of a finite field Fq of q elements or their extensions by adding a zero element; a map f: S S of S into itself can be specified by a system of polynomials f1,…,fm є Fq[x1,…,x m]. Necessary and sufficient conditions, for which the map f =< f1,…,fm >  is bijective, were obtained. Then this problem was generalized to the case when the subsets Si are any subsets of Fq. The obtained results can be used to construct S-boxes and P-boxes in block ciphers and to calculate automorphism groups of error-correcting codes.

Keywords: cryptography, error-correcting codes, finite fields, permutation polynomials

References

1. Lidl R., Niederreiter H. Finite Fields. Addison Wesley, 1983. 755 p.

2. Sushchevskii D.G., Panchenko O.V., Kugurakov V.S. Modern cryptosystems and their features. Vestn. Kazan. Tekhnol. Univ., 2015, vol. 18, no. 11, pp. 194–198. (In Russian)

3. Kugurakov V.S., Kirpichnikov A.P., Suchshevskii D.G. On pseudo-random PIN code generation using the cryptographic method. Vestn. Kazan. Tekhnol. Univ., 2015, vol. 18, no. 17, pp. 190–193. (In Russian)

4. Kugurakov V., Gainutdinova A. On the full monomial automorphism groups of Reed–Solomon codes and their MDS-extensions. Lobachevskii J. Math., 2016, vol. 37, no. 6, pp. 650–669. doi: 10.1134/S1995080216060160.

5. Kugurakov V.S., Gainutdinova A., Anisimova T. On calculation of monomial automorphisms of linear cyclic codes. Lobachevskii J. Math., 2018, vol. 39, no. 7, pp. 1024–1038. doi: 10.1134/S1995080218070168.

6. Kugurakov V.S. On the symmetry of one class of codes. Veroyatn. Metody Kibern., 1993, no. 25, pp. 91–99. (In Russian)


The content is available under the license Creative Commons Attribution 4.0 License.