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2020-04-10T03:19:31+00:00
Kth power map is bijective iff k is relatively prime to the order
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2008-10-26T00:04:54Z
2454765.5034028
Kth power map is bijective iff k is relatively prime to the order
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Kth power map is bijective iff k is relatively prime to the order#DummitFoote
Cube map is endomorphism iff abelian (if order is not a multiple of 3)
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Cube map is endomorphism iff abelian (if order is not a multiple of 3)
Frattini-in-center odd-order p-group implies (mp plus 1)-power map is automorphism
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Frattini-in-center odd-order p-group implies (mp plus 1)-power map is automorphism
N-abelian iff abelian (if order is relatively prime to n(n-1))
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N-abelian iff abelian (if order is relatively prime to n(n-1))
Snevily's conjecture for subsets of size two
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Snevily's conjecture for subsets of size two
Odd-order cyclic group equals derived subgroup of holomorph
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Odd-order cyclic group equals derived subgroup of holomorph
Class equation of a group relative to a prime power
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Class equation of a group relative to a prime power
Nth power map is bijective iff n is relatively prime to the order
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Nth power map is bijective iff n is relatively prime to the order
Uses
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Uses