Мақаланы E-mail арқылы жіберу Primitive elements of free non-associative algebras over finite fields
- Авторлар: Maisuradze M.1, Mikhalev А.1
-
Мекемелер:
- Moscow State University
- Шығарылым: № 2 (2024)
- Беттер: 84-92
- Бөлім: КОМПЬЮТЕРНАЯ АЛГЕБРА
- URL: https://journals.rcsi.science/0132-3474/article/view/262652
- DOI: https://doi.org/10.31857/S0132347424020115
- EDN: https://elibrary.ru/RODPXT
- ID: 262652
Дәйексөз келтіру
Ашық рұқсат
Рұқсат берілді
Тек жазылушылар үшін
Аннотация
The representation of elements of free non-associative algebras as a set of multidimensional tables of coefficients is defined. An operation for finding partial derivatives for elements of free non-associative algebras in the same form is considered. Using this representation, a criterion of primitivity for elements of lengths 2 and 3 in terms of matrix ranks, as well as a primitivity test for elements of arbitrary length, is derived. This test makes it possible to estimate the number of primitive elements in free non-associative algebras with two generators over a finite field. The proposed representation allows us to optimize algorithms for symbolic computations with primitive elements. Using these algorithms, we find the number of primitive elements of length 4 in a free non-associative algebra of rank 2 over a finite field.
Авторлар туралы
M. Maisuradze
Moscow State University
Хат алмасуға жауапты Автор.
Email: maisuradzemv@my.msu.ru
Department of Mechanics and Mathematics
Ресей, Moscow, 119991А. Mikhalev
Moscow State University
Email: aamikhalev@mail.ru
Department of Mechanics and Mathematics
Ресей, Moscow, 119991Әдебиет тізімі
- Artamonov V.A., Klimakov A.V., Mikhalev A.A., Mikhalev A.V. Primitive and almost-primitive elements of free algebras of Schreier varieties, Fundam // Prikl. Mat. 2016. V. 21. № 2. P. 3–35.
- Kurosh A.G. Free non-associative algebras and free products of algebras // Mat. Sb. 1947. V. 20. P. 239–262.
- Maisuradze M.V. Software implementation of algorithms for working with primitive elements in free nonassociative algebras // Intellekt. Sist. Teor. Prilozh. 2021. V. 25. № 4. P. 170–175.
- Mikhalev A.A., Mikhalev A.V., Chepovskii A.A., Shampan’er K. Primitive elements of free associative algebras // Fundam. Prikl. Mat. 2007. V. 13. № 5. P. 171–192.
- Chepovskii A.A. Primitive elements of algebras of Schreier varieties, Cand. Sci. (Phys.-Math.) Dissertation, Moscow: Mosk. Gos. Univ., 2011.
- Chepovskii A.A. Number of primitive elements of lengths 1 and 2 in free non-associative algebras over a finite field // Vestn. Novosib. Gos. Univ. Ser.: Mat., Mekh., Inf. 2011. V. 11. P. 119–122.
- Mikhalev A.A., Umirbaev U.U., Yu J.-T. Automorphic orbits of elements of free non-associative algebras, J. Algebra. 2001. P. 198–223.
- Mikhalev A.A., Shpilrain V., Yu J.-T. Combinatorial Methods: Free Groups, Polynomials, and Free Algebras, New York: Springer, 2004.
