Lower central words in finite p-groups
Pith reviewed 2026-05-24 15:21 UTC · model grok-4.3
The pith
If γ_r(G) is 2-generated in a finite p-group G then every element of γ_r(G) is a γ_r-value, for every prime p and without any abelian assumption.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
For any prime p, if G is a finite p-group such that the verbal subgroup γ_r(G) is 2-generator, then γ_r(G) consists only of γ_r-values. The same holds when G is a pro-p group.
What carries the argument
The 2-generator condition on the verbal subgroup γ_r(G), which forces every element to be expressible as a single value of the lower central word rather than a product of several.
If this is right
- The conclusion holds for p=3 as well as all larger primes.
- The abelian hypothesis on γ_r(G) is unnecessary.
- The identical statement is true for pro-p groups.
- The set of γ_r-values equals the whole verbal subgroup under the stated generator bound.
Where Pith is reading between the lines
- Similar generator restrictions might force other verbal subgroups to coincide with their word values in p-groups.
- The result supplies a uniform description of the lower central series factors in pro-p groups that satisfy the 2-generator condition at each step.
- Computational checks in small-order p-groups could verify the boundary between 2-generated and 3-generated cases.
Load-bearing premise
That the verbal subgroup γ_r(G) can be generated by only two elements.
What would settle it
A concrete finite p-group G in which γ_r(G) is 2-generated yet contains at least one element that is not equal to any single γ_r-value.
read the original abstract
It is well known that the set of values of a lower central word in a group $G$ need not be a subgroup. For a fixed lower central word $\gamma_r$ and for $p\ge 5$, Guralnick showed that if $G$ is a finite $p$-group such that the verbal subgroup $\gamma_r(G)$ is abelian and 2-generator, then $\gamma_r(G)$ consists only of $\gamma_r$-values. In this paper we extend this result, showing that the assumption that $\gamma_r(G)$ is abelian can be dropped. Moreover, we show that the result remains true even if $p=3$. Finally, we prove that the analogous result for pro-$p$ groups is true.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The paper extends Guralnick's theorem on lower central words: for a finite p-group G with γ_r(G) 2-generated, it shows that γ_r(G) equals the set of γ_r-values without assuming γ_r(G) is abelian (for p ≥ 5 originally, now including p=3). It also proves the analogous statement for pro-p groups.
Significance. If correct, the result removes the abelian hypothesis from the prior theorem while retaining the explicit 2-generator condition, extends the statement to p=3, and adds the pro-p case. This clarifies the structure of verbal subgroups generated by lower central words in p-groups and pro-p groups. The work is presented as a direct extension with no hidden parameters or circular reductions.
minor comments (2)
- The abstract states the extensions but does not explicitly repeat the 2-generator hypothesis for the new claims (though it is retained from the Guralnick setup being extended).
- A brief remark on whether the proofs adapt existing techniques or require new arguments would help readers assess the technical novelty.
Simulated Author's Rebuttal
We thank the referee for the positive assessment of our work and the recommendation of minor revision. The report contains no specific major comments requiring point-by-point rebuttal.
Circularity Check
No significant circularity; derivation extends external theorem independently
full rationale
The paper's central claims extend Guralnick's prior theorem on verbal subgroups in p-groups by removing the abelian hypothesis, lowering the p threshold to 3, and adding the pro-p case, while explicitly retaining the 2-generator condition from the external setup. No load-bearing steps reduce by the paper's own equations to self-defined quantities, fitted inputs renamed as predictions, or self-citation chains; the cited result is independent (different authors) and the proofs are presented as direct extensions without internal redefinition or smuggling of ansatzes. This is the normal case of a self-contained extension of an external benchmark.
Axiom & Free-Parameter Ledger
axioms (1)
- standard math Standard axioms of group theory (associativity, identity, inverses) and the definition of the lower central series γ_r(G).
Reference graph
Works this paper leans on
-
[1]
C. Acciarri, P. Shumyatsky, On profinite groups in which c ommutators are covered by finitely many subgroups, Mathematische Zeitschrift 279 (2013), 239–248
work page 2013
-
[2]
Berkovich, Yakov Groups of prime power order. Vol. 1. De G ruyter Expositions in Mathematics, 46. Walter de Gruyter GmbH & Co. KG, Berlin, 200 8
-
[3]
Blackburn, On prime-power groups in which the derived group has two generators, Proc
N. Blackburn, On prime-power groups in which the derived group has two generators, Proc. Cambridge Philos. Soc. 53 (1957), 19–27
work page 1957
- [4]
-
[5]
de las Heras, Commutators in finite p-groups with 3-generator derived subgroup, ArXiv
I. de las Heras, Commutators in finite p-groups with 3-generator derived subgroup, ArXiv
-
[6]
I. de las Heras, G. Fernndez-Alcober, Commutators in fini te p-groups with 2-generator derived subgroup, Israel Journal of Mathematics , to appear
-
[7]
J.D. Dixon, M.P.F. du Sautoy, A. Mann, and D. Segal, Analy tic pro-p groups, 2nd edition, Cambridge University Press, 1999
work page 1999
-
[8]
Guralnick, Commutators and commutator subgroups
R.M. Guralnick, Commutators and commutator subgroups. Advances in Math. , 45 (1982), 319-330
work page 1982
-
[9]
Guralnick, Generation of the lower central series
R.M. Guralnick, Generation of the lower central series. Glasgow Math. J. , 23 (1982), 15-20
work page 1982
-
[10]
Guralnick, Generation of the lower central series II
R.M. Guralnick, Generation of the lower central series II. Glasgow Math. J. , 25 (1984), 193-201
work page 1984
-
[11]
L.-C. Kappe, R.F. Morse, On commutators in p-groups, J. Group Theory 8 (2005), 415-429
work page 2005
-
[12]
L.-C. Kappe, R.F. Morse, On commutators in groups, in Groups St Andrews 2005, Volume 2, pp. 531-558, Cambridge University Press, 2007
work page 2005
-
[13]
Khukhro, p-Automorphisms of Finite p-Groups, Cambridge University Press, 1998
E.I. Khukhro, p-Automorphisms of Finite p-Groups, Cambridge University Press, 1998
work page 1998
-
[14]
C.R. Leedham-Green, S. McKay, The Structure of Groups of Prime Power Order , Oxford University Press, 2002
work page 2002
-
[15]
M.W. Liebeck, E.A. O’Brien, A. Shalev, and P.H. Tiep, Th e Ore conjecture, J. European Math. Soc. 12 (2010), 939–1008
work page 2010
-
[16]
Macdonald, On cyclic commutator subgroups
I.D. Macdonald, On cyclic commutator subgroups. J. London Math. Soc. (1) 38 (1963), 419-422
work page 1963
-
[17]
Macdonald, The theory of groups , Clarendon Press, 1968
I.D. Macdonald, The theory of groups , Clarendon Press, 1968
work page 1968
-
[18]
Robinson, A Course in the Theory of Groups
D.J.S. Robinson, A Course in the Theory of Groups . Second edition. Graduate Texts in Mathematics, 80. Springer-Verlag, New York, 1996
work page 1996
-
[19]
Rodney, On cyclic derived subgroups, J
D.M. Rodney, On cyclic derived subgroups, J. London Math. Soc. (2) 8 (1974), 642– 646
work page 1974
-
[20]
Rodney, Commutators and abelian groups, J
D.M. Rodney, Commutators and abelian groups, J. Austral. Math. Soc. 24 (1977), 79-91
work page 1977
-
[21]
Segal, Words, Notes on Verbal Width in Groups
D. Segal, Words, Notes on Verbal Width in Groups . Cambridge University Press, 2009. LOWER CENTRAL WORDS IN FINITE p-GROUPS 23 Zientzia eta Teknologia F akultatea, Matematika Saila, Eus kal Herriko Unibertsitatea (UPV/EHU), Sarriena Auzoa z/g, 48940 Leioa , Spain. E-mail address : iker.delasheras@ehu.eus Dipartimento di Matematica, Universit `a di Bologna...
work page 2009
discussion (0)
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