Results 121 to 130 of about 1,775 (180)

Targeting Dendritic Cells with Virus-like Particles: Toward Safer and More Immunogenic Vaccines. [PDF]

Vaccines (Basel)
Jonny J, Nidom CA, Putranto TA, Wirjopranoto S, Sudiana IK, Pratiwi ED, Mawaddah TW, Nidom AN, Nidom RV, Indrasari S, Rosytania IY, Larasati AD.   +11 more
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The Effect of Thyrotropin Suppression on Survival Outcomes in Patients with Differentiated Thyroid Cancer: A Systematic Review and Meta-Analysis. [PDF]

Thyroid
Gubbi S, Al-Jundi M, Foerster P, Cardenas S, Butera G, Auh S, Wright EC, Klubo-Gwiezdzinska J.   +7 more
europepmc   +1 more source

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GROUPS WITH SUBNORMAL NORMALIZERS OF SUBNORMAL SUBGROUPS

Bulletin of the Australian Mathematical Society, 2012
AbstractWe consider the class of solvable groups in which all subnormal subgroups have subnormal normalizers, a class containing many well-known classes of solvable groups. Groups of this class have Fitting length three at most; some other information connected with the Fitting series is given.
Beidleman, J. C., Heineken, H.
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Inductive sources and subnormal subgroups

Archiv der Mathematik, 2004
By a character pair in a finite group \(G\) is meant a pair \((H,\theta)\), where \(H\leq G\) and \(\theta\in\text{Irr}(H)\). The group \(G\) acts on the set of character pairs by \((H,\theta)^g=(H^g,\theta^g)\), where \(g\in G\). The character \(\theta^g\) of \(H^g\) is defined by the formula \(\theta^g(h^g)=\theta(h)\) for \(h\in H\).
Isaacs, I. M., Lewis, Mark L.
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Subnormal Subgroups of Division Rings

Canadian Journal of Mathematics, 1963
Let K be a division ring. A subgroup H of the multiplicative group K′ of K is subnormal if there is a finite sequence (H = A0, A1, . . . , An = K′) of subgroups of K′ such that each Ai is a normal subgroup of Ai+1. It is known (2, 3) that if H is a subdivision ring of K such that H′ is subnormal in K′, then either H = K or H is in the centre Z(K) of K.
Herstein, I. N., Scott, W. R.
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Finite Groups with Subnormal Schmidt Subgroups

Siberian Mathematical Journal, 2004
A Shmidt group is a finite nonnilpotent group with nilpotent proper subgroups. Given a prime \(p\), a \(pd\)-group is a finite group such that \(p\) divides its order. The authors study the finite groups for which some Shmidt \(pd\)-subgroups are subnormal.
Knyagina, V. N., Monakhov, V. S.
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Non-subnormal subgroups of groups

Journal of Pure and Applied Algebra, 2013
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Coradicals of subnormal subgroups

Algebra and Logic, 1995
IfF is a nonempty formation, then theF-coradical of a finite group G is the intersection of all those normal subgroups N of G for which G / N ∈F. We study the structure of theF-coradical of a group generated by two subnormal subgroups of a finite group.
S. F. Kamornikov, L. A. Shemetkov
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