Zobrazeno 1 - 10
of 65
pro vyhledávání: '"O V, Markova"'
Autor:
O. V. Markova
Publikováno v:
Journal of Mathematical Sciences. 272:566-573
Autor:
O. V. Markova, D. Yu. Novochadov
Publikováno v:
Journal of Mathematical Sciences. 272:574-591
Autor:
N. M. Adrianov, V. A. Artamonov, I. N. Balaba, Yu. A. Bahturin, L. A. Bokut, V. V. Borisenko, E. I. Bunina, I. A. Chubarov, S. A. Gaifullin, S. T. Glavatskii, I. Z. Golubchik, S. González, A. V. Grishin, A. E. Guterman, N. I. Dubrovin, N. K. Ilyina, A. Ya. Kanel-Belov, A. L. Kanunnikov, E. S. Kislitsyn, V. K. Kharchenko, A. A. Klyachko, I. B. Kozhukhov, E. M. Kreines, O. V. Kulikova, T. P. Lukashenko, O. V. Markova, C. Martínez, A. A. Mikhalev, A. V. Mikhalev, A. Yu. Olshanskii, S. V. Pchelintsev, A. E. Pentus, A. V. Petrov, Yu. G. Prokhorov, A. A. Shafarevich, A. I. Shafarevich, I. P. Shestakov, E. E. Shirshova, V. E. Shpilrain, V. V. Tenzina, D. A. Timashev, A. A. Tuganbaev, I. N. Tumaykin, M. V. Zaicev, E. I. Zelmanov
Publikováno v:
Journal of Mathematical Sciences. 262:592-602
Autor:
O. V. Markova
Publikováno v:
Journal of Mathematical Sciences. 262:740-748
Autor:
O. V. Markova, D. Yu. Novochadov
Publikováno v:
Journal of Mathematical Sciences. 262:99-107
Autor:
N. A. Kolegov, O. V. Markova
Publikováno v:
Journal of Mathematical Sciences. 262:62-83
Autor:
S. R. Garipova, O. V. Markova, K. A. Fedorova, M. A. Dedova, M. A. Iksanova, A. A. Kamaletdinova, O. V. Lastochkina, L. I. Pusenkova
Publikováno v:
Acta Physiologiae Plantarum. 44
Autor:
M. A. Khrystik, O. V. Markova
Publikováno v:
Journal of Mathematical Sciences. 255:324-331
In this paper, the length of the group algebra of a dihedral group in the modular case is computed under the assumption that the order of the group is a power of two. Various methods for studying the length of a group algebra in the modular case are
Autor:
O. V. Markova, N. A. Kolegov
Publikováno v:
Journal of Mathematical Sciences. 249:209-220
The matrix relation AB = CBA is investigated. An explicit description of the space of matrices B satisfying this relation is obtained for an arbitrary fixed matrix C and a diagonalizable matrix A. The connection between this space and the family of r
Publikováno v:
Journal of Mathematical Sciences. 249:158-166
A lower and an upper bounds for the length of a direct sum of nonassociative algebras are obtained, and their sharpness is established. Note that while the lower bound for the length of a direct sum in the associative and nonassociative cases turns o