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Factorizations in the elementary Abelian p-group and their cryptographic significance
Journal of Cryptology, 1994Let \(G\) be a finite abelian group, and let \(A_i\) be a subset with at least two elements (for \(i=1,\dots,s\)). The ordered collection \({\mathbf A}=(A_1,\dots,A_s)\) is called a factorization of \(G\) if and only if each group element may be written uniquely as a product of the form \(a_1\dots a_s\) with \(a_i\in A_i\) for \(i=1,\dots,s ...
Qu, Minghua, Vanstone, S. A.
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Hilbert's Theorem 90 and the Segal Conjecture for Elementary Abelian p-Groups
American Journal of Mathematics, 1985Let V be an n-dimensional vector space over \({\mathbb{F}}_ p\) and set \(S=H^*(V; {\mathbb{F}}_ p)\). Part of the homological algebra that goes into the proof of the Segal conjecture is an isomorphism \[ Tor_*^{A_ p}({\mathbb{F}}_ p,S[L^{-1}])\cong \oplus^{N}_{1}Tor_*^{A_ p}(F_ p,\Sigma^{-n}{\mathbb{F}}_ p) \] where \(N=p^{\left( \begin{matrix} n\\ 2 ...
Priddy, Stewart, Wilkerson, Clarence
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Derived Length of Finite p -Groups Factorable by Normal Elementary Abelian Subgroups
Algebra and Logic, 2015zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Maximal Sum-Free Sets in Elementary Abelian p-Groups
Canadian Mathematical Bulletin, 1971Given an additive group G and nonempty subsets S, T of G, let S+T denote the set ﹛s + t | s ∊ S, t ∊ T﹜, S the complement of S in G and |S| the cardinality of S. We call S a sum-free set in G if (S+S) ⊆ S. If, in addition, |S| ≥ |T| for every sum-free set T in G, then we call S a maximal sum-free set in G. We denote by λ(G) the cardinality of a maximal
Rhemtulla, A. H., Street, A. P.
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Finite non-elementary abelian p-groups whose number of subgroups is maximal
Israel Journal of Mathematics, 2012Let \(G\) be a finite non-elementary Abelian \(p\)-group, \(p>2\), \(M_p(1,1,1)\) a nonabelian group of order \(p^3\) and exponent \(p\), \(E\) an elementary Abelian \(p\)-group. If \(G\) is a group with the title property, then \(G=M_p(1,1,1)\times E\).
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A Criterion of Elementary Equivalence of Automorphism Groups of Unreduced Abelian p-Groups
Journal of Mathematical Sciences, 2013zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Quasi-Boolean powers of elementary abelianp-groups
Mathematical Notes, 1999zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Modules for Elementary Abelian p-groups
Proceedings of the International Congress of Mathematicians 2010 (ICM 2010), 2011openaire +1 more source
The evolving landscape of salivary gland tumors
Ca-A Cancer Journal for Clinicians, 2023Conor Steuer
exaly