TY - JOUR

T1 - Structure of k-Closures of Finite Nilpotent Permutation Groups

AU - Churikov, D. V.

N1 - Funding Information: Supported by Mathematical Center in Akademgorodok, Agreement with RF Ministry of Education and Science No. 075-15-2019-1613. Publisher Copyright: © 2021, Springer Science+Business Media, LLC, part of Springer Nature.

PY - 2021/5

Y1 - 2021/5

N2 - Let G be a permutation group of a set Ω and k be a positive integer. The k-closure of G is the greatest (w.r.t. inclusion) subgroup G(k) in Sym(Ω) which has the same orbits as has G under the componentwise action on the set Ωk. It is proved that the k-closure of a finite nilpotent group coincides with the direct product of k-closures of all of its Sylow subgroups.

AB - Let G be a permutation group of a set Ω and k be a positive integer. The k-closure of G is the greatest (w.r.t. inclusion) subgroup G(k) in Sym(Ω) which has the same orbits as has G under the componentwise action on the set Ωk. It is proved that the k-closure of a finite nilpotent group coincides with the direct product of k-closures of all of its Sylow subgroups.

KW - finite nilpotent group

KW - k-closure

KW - Sylow subgroup

UR - http://www.scopus.com/inward/record.url?scp=85115135617&partnerID=8YFLogxK

U2 - 10.1007/s10469-021-09637-9

DO - 10.1007/s10469-021-09637-9

M3 - Article

AN - SCOPUS:85115135617

VL - 60

SP - 154

EP - 159

JO - Algebra and Logic

JF - Algebra and Logic

SN - 0002-5232

IS - 2

ER -