Standard

Pairs of microweight tori in GL_n. / Nesterov, Vladimir; Vavilov, Nilolai.

в: Чебышевский сборник, Том XXI, № 3(75), 28.06.2020, стр. 256-265.

Результаты исследований: Научные публикации в периодических изданияхстатья

Harvard

Nesterov, V & Vavilov, N 2020, 'Pairs of microweight tori in GL_n', Чебышевский сборник, Том. XXI, № 3(75), стр. 256-265. https://doi.org/10.22405/2226-8383-2020-21-3

APA

Nesterov, V., & Vavilov, N. (2020). Pairs of microweight tori in GL_n. Чебышевский сборник, XXI(3(75)), 256-265. https://doi.org/10.22405/2226-8383-2020-21-3

Vancouver

Nesterov V, Vavilov N. Pairs of microweight tori in GL_n. Чебышевский сборник. 2020 Июнь 28;XXI(3(75)):256-265. https://doi.org/10.22405/2226-8383-2020-21-3

Author

Nesterov, Vladimir ; Vavilov, Nilolai. / Pairs of microweight tori in GL_n. в: Чебышевский сборник. 2020 ; Том XXI, № 3(75). стр. 256-265.

BibTeX

@article{301cf43bc22f4e32941b857e76346b6e,
title = "Pairs of microweight tori in GL_n",
abstract = "In the present note we prove a reduction theorem for subgroups of the general linear group GL(n, T) over a skew-field T , generated by a pair of microweight tori of the same type. It turns out, that any pair of such tori of residue m is conjugate to such a pair in GL(3m, T) , and the pairs that cannot be further reduced to GL(3m − 1, T) form a single GL(3m, T) -orbit. For the case m = 1 it leaves us with the analysis of GL(2, T) , which was thoroughly studied some two decades ago by the second author, Cohen, Cuypers and Sterk. For the next case m = 2 this means that the only cases to be considered are GL(4, T) and GL(5, T) . In these cases the problem can be fully resolved by (direct but rather lengthy) matrix calculations, which are relegated to a forthcoming paper by the authors.",
keywords = "полная линейная группа, унипотентные группы, микровесовые торы, диагональная подгруппа, general linear groups, unipotent root subgroups, semisimple root subgroups, diagonal subgroup, m-tori",
author = "Vladimir Nesterov and Nilolai Vavilov",
year = "2020",
month = jun,
day = "28",
doi = "10.22405/2226-8383-2020-21-3",
language = "English",
volume = "XXI",
pages = "256--265",
journal = "Chebyshevskii Sbornik",
issn = "2226-8383",
publisher = "Тульский государственный педагогический университет им. Л. Н. Толстого",
number = "3(75)",

}

RIS

TY - JOUR

T1 - Pairs of microweight tori in GL_n

AU - Nesterov, Vladimir

AU - Vavilov, Nilolai

PY - 2020/6/28

Y1 - 2020/6/28

N2 - In the present note we prove a reduction theorem for subgroups of the general linear group GL(n, T) over a skew-field T , generated by a pair of microweight tori of the same type. It turns out, that any pair of such tori of residue m is conjugate to such a pair in GL(3m, T) , and the pairs that cannot be further reduced to GL(3m − 1, T) form a single GL(3m, T) -orbit. For the case m = 1 it leaves us with the analysis of GL(2, T) , which was thoroughly studied some two decades ago by the second author, Cohen, Cuypers and Sterk. For the next case m = 2 this means that the only cases to be considered are GL(4, T) and GL(5, T) . In these cases the problem can be fully resolved by (direct but rather lengthy) matrix calculations, which are relegated to a forthcoming paper by the authors.

AB - In the present note we prove a reduction theorem for subgroups of the general linear group GL(n, T) over a skew-field T , generated by a pair of microweight tori of the same type. It turns out, that any pair of such tori of residue m is conjugate to such a pair in GL(3m, T) , and the pairs that cannot be further reduced to GL(3m − 1, T) form a single GL(3m, T) -orbit. For the case m = 1 it leaves us with the analysis of GL(2, T) , which was thoroughly studied some two decades ago by the second author, Cohen, Cuypers and Sterk. For the next case m = 2 this means that the only cases to be considered are GL(4, T) and GL(5, T) . In these cases the problem can be fully resolved by (direct but rather lengthy) matrix calculations, which are relegated to a forthcoming paper by the authors.

KW - полная линейная группа, унипотентные группы, микровесовые торы, диагональная подгруппа

KW - general linear groups

KW - unipotent root subgroups

KW - semisimple root subgroups

KW - diagonal subgroup

KW - m-tori

U2 - 10.22405/2226-8383-2020-21-3

DO - 10.22405/2226-8383-2020-21-3

M3 - Article

VL - XXI

SP - 256

EP - 265

JO - Chebyshevskii Sbornik

JF - Chebyshevskii Sbornik

SN - 2226-8383

IS - 3(75)

ER -

ID: 60271621