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Q&A: who is H. sapiens really, and how do we know? [PDF]
BMC Biol, 2011 Liang M, Nielsen R.
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Antihypertensive efficacy of the angiotensin receptor blocker azilsartan medoxomil compared with the angiotensin-converting enzyme inhibitor ramipril. [PDF]
J Hum Hypertens, 2013 Bönner G +8 more
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A high-coverage genome from a 200,000-year-old Denisovan
Peyrégne S +23 more
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El grupu neandertal de la Cueva d’El Sidrón (Borines, Piloña) [PDF]
Cañaveras Jiménez, Juan Carlos +2 more
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3D enamel thickness in Neandertal and modern human permanent canines.
J Hum Evol, 2017 Buti L +7 more
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Shunkov Groups Saturated with Almost Simple Groups
Algebra and Logic, 2023A group \(G\) is a Shunkov group if whenever \(H\) is a finite subgroup of \(G\) any two conjugate elements of prime order in the group \(N_G(H)/H\) generate a finite subgroup. The class of such groups forms a generalization of the class of locally finite groups.
Maslova, N. V., Shlepkin, A. A.
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Characterizations of the Shunkov groups
Ukrainian Mathematical Journal, 2008We study the structure of a family of finite groups of the form L g = 〈a, a g 〉 in a periodic Shunkov group. As a consequence of the obtained result, we get two characterizations of periodic Shunkov groups.
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Periodic part in some Shunkov groups
Algebra and Logic, 1999A group G is saturated with groups in a set X if every finite subgroup of G is embeddable in G into a subgroup L isomorphic to some group in X. We show that a Shunkov group has a periodic part if the saturating set for it coincides with one of the following: {L2(q)}, {Sz(q)}, {Re(q)}, or {U3(2n)}.
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The structure of an infinite Sylow subgroup in some periodic Shunkov groups
Discrete Mathematics and Applications, 2002AbstractWe study periodic groups such that the normaliser of any finite non-trivial subgroup of such a group is almost layer-finite. The class of groups satisfying this condition is rather wide and includes the free Burnside groups of odd period which is greater than 665 and the groups constructed by A. Yu. Olshanskii.We consider the classical question:
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Shunkov groups with primary minimality condition. II
1998zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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