S. P. Glasby
Published 2018-01-17Version 1
We prove that the minimal composition length, $c$, of a solvable group with solvable length $d$ satisfies $9^{(d-3)/9}< c< 9^{(d+1)/5}$, and the minimal composition length, $c^o$, of a group with odd order and solvable length $d$ satisfies $7^{(d-2)/5}< c^o< 2^d$.
Comments: Added to arXiv in 2018
Journal: Groups St Andrews 2005, vol. 2, Edited by C.M. Campbell, M.R. Quick, E.F. Robertson and G.C. Smith, London Mathematical Society Lecture Notes Series 340, Cambridge Univ. Press, (2007), 432--437
Solvable groups with a given solvable length, and minimal composition length
Cohomology and profinite topologies for solvable groups of finite rank
Embedding theorems for solvable groups
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