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2020-04-06T22:06:20+00:00
Equivalence of definitions of nilpotent group that is torsion-free for a set of primes
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principle of mathematical induction
2016-09-09T23:50:26Z
2457641.4933565
Equivalence of definitions of nilpotent group that is torsion-free for a set of primes
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Equivalence of definitions of nilpotent group that is torsion-free for a set of primes#Nilpotent group that is torsion-free for a set of primes;1
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[[Proof method::Upward induction on upper central series]]
Equivalence of definitions of nilpotent group that is torsion-free for a set of primes
Nilpotent-quotient implies subgroup-to-quotient powering-invariance implication
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Nilpotent-quotient implies subgroup-to-quotient powering-invariance implication
Center is quotient-torsion-freeness-closed in nilpotent group
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Center is quotient-torsion-freeness-closed in nilpotent group
Local powering-invariant and normal iff quotient-local powering-invariant in nilpotent group
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Local powering-invariant and normal iff quotient-local powering-invariant in nilpotent group
There exist infinite nilpotent groups in which every automorphism is inner
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There exist infinite nilpotent groups in which every automorphism is inner
Local powering-invariant subgroup containing the center is intermediately powering-invariant in nilpotent group
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Local powering-invariant subgroup containing the center is intermediately powering-invariant in nilpotent group
Local powering-invariant subgroup containing the center is intermediately local powering-invariant in nilpotent group
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Local powering-invariant subgroup containing the center is intermediately local powering-invariant in nilpotent group
Equivalence of definitions of LUCS-Baer Lie group
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Equivalence of definitions of LUCS-Baer Lie group
Equivalence of definitions of nilpotent group that is divisible for a set of primes
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Equivalence of definitions of nilpotent group that is divisible for a set of primes
Uses
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Uses
Dual
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Dual