Round 8: Tossup 7
A finite extension of the rationals has a property of this name if and only if it is contained in a cyclotomic field. The Mordell-Weil theorem applies to structures like elliptic curves that have a property of this name when considered as varieties. For a group to be solvable, each quotient group in its subnormal series must have a property of this name. If a group has a property of this name, its torsion elements form a subgroup, and it equals its own (*) center. By a fundamental theorem, finite groups with that property of this name are the direct sum of cyclic groups of prime power order. If a group has a property of this name, its Cayley table is symmetric and any conjugation is the identity; such groups include Z/nZ (“Z-mod-n-Z”). For 10 points, a group whose binary operation is commutative has what property named for a Norwegian mathematician? ■END■
ANSWER: abelian [accept abelian groups or abelian varieties or abelian extensions; accept commutative group before read] (The first sentence is the Kronecker-Weber theorem.)
<JF, Other Science (Math)> | NAFTA-Packet-8
= Average correct buzzpoint
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