JOURNAL ARTICLE
The number of conjugacy classes of non-normal subgroups in nilpotent groups
Year: 1996 Journal: Communications in Algebra Vol: 24 (10)Pages: 3237-3245 Publisher: Taylor & Francis
Abstract
Abstract In a recent paper, Rolf Brandi classified all finite groups having exactly one conjugacy class of nonnormal subgroups, and conjectured thatfor a nilpotent group G of nilpotency class c = c(G) the number v(G) = vof conjugacy classes of nonnormal subgroups satisfies the inequality v(G) ≥ c(G) – 1 (with the exception of the Hamiltonian groups, of course). The purpose of this paper is to establish this conjecture and to decide when this inequality is sharp.
Keywords:
Conjugacy class Mathematics Nilpotent Conjecture Class (philosophy) Nilpotent group Pure mathematics Combinatorics Computer science
Metrics
20
Cited By
2.05
FWCI (Field Weighted Citation Impact)
5
Refs
0.82
Citation Normalized Percentile
Is in top 1%
Is in top 10%
Citation History
Topics
Finite Group Theory Research
Physical Sciences → Mathematics → Discrete Mathematics and Combinatorics
graph theory and CDMA systems
Physical Sciences → Engineering → Electrical and Electronic Engineering
Limits and Structures in Graph Theory
Physical Sciences → Mathematics → Discrete Mathematics and Combinatorics
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