Results 51 to 60 of about 203 (134)
Characters Induced from Sylow Subgroups
Let \(G\) be a finite group and let \(p\) be a prime dividing \(| G|\). The paper deals with the question: What can be said about the structure of \(G\) if there exists a \(\chi\in\text{Irr}(G)\) which is induced from a Sylow-\(p\)-subgroup of \(G\) or equivalently, for which \(| G|/\chi(1)\) is a power of \(p\).
Riese, Udo, Schmid, Peter
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NOX2 deficiency exacerbates diet-induced obesity and impairs molecular training adaptations in skeletal muscle. [PDF]
Henriquez-Olguin C +9 more
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On second maximal subgroups of Sylow subgroups of finite groups
Given a group \(G\), a subgroup \(K\) is called a second maximal subgroup if there exists a maximal subgroup \(M\) of \(G\) such that \(K\) is a maximal subgroup of \(M\). Several authors have studied the influence of the embedding of second maximal subgroups on the structure of a group.
Ballester-Bolinches, A. +2 more
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Adenosine monophosphate-activated protein kinase is elevated in human cachectic muscle and prevents cancer-induced metabolic dysfunction in mice. [PDF]
Raun SH +11 more
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Finite groups with certain subgroups of Sylow subgroups complemented
Let \(\mathcal I\) be a saturated formation containing the class of supersoluble groups, \(G\) be a finite group with a normal subgroup \(E\) such that \(G/E\in\mathcal I\), and \(F^*(E)\) the generalised Fitting subgroup of \(E\). Theorem 1.3: If \(P\) is a Sylow subgroup of \(E\) and \(P\) has a proper subgroup \(D\) such that each subgroup \(H\) of \
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Childhood asthma is associated with development of type 1 diabetes and inflammatory bowel diseases: a Danish nationwide registry study. [PDF]
Liljendahl MS +6 more
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A Transfer Result for Powerful Sylow Subgroups
By \(P^n\) we denote the subgroup generated by all \(n\)-th powers of elements of \(P\). A \(p\)-group \(P\) is called powerful if either \(p\) is odd, and \(P^p\geq P'\), or \(p=2\), and \(P^4\geq P'\). A \(p\)-group \(P\) is called regular if for every \(x,y\in P\) we have \((xy)^p\equiv x^py^p\bmod (H')^p\), where \(H=\langle x,y\rangle\). Let \(G\)
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On Sylow Subgroups of Local Galois-Groups
Let \(p\) be an odd prime, and let \({\mathcal P}\) denote the class of \(p\)- groups which occur as Sylow \(p\)-subgroups of finite Galois groups over the \(p\)-adic field \(\mathbb{Q}_p\). It is proved that \({\mathcal P}\) contains every abelian \(p\)-group of rank \(\leq (p - 1)^2\), and that certain nonabelian \(p\)-groups do not belong to ...
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Unit groups of some multiquadratic number fields and 2-class groups. [PDF]
Chems-Eddin MM.
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