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Date: 2011-11-07 07:13:30 Group theory Torsion Abelian group Homomorphism Quotient group Group action Direct product of groups Subgroup Commutator subgroup Symmetric cone		config-space-commentsdvi Add to Reading List Source URL: www.kurims.kyoto-u.ac.jp Download Document from Source Website File Size: 85,44 KB Share Document on Facebook

	GENERALIZED QUATERNIONS KEITH CONRAD 1. introduction The quaternion group Q8 is one of the two non-abelian groups of size 8 (up to isomorphism). The other one, D4 , can be constructed as a semi-direct product: D4 ∼ DocID: 1uRcx - View Document
	Elements and cyclic subgroups of finite order of the Cremona group J´er´emy Blanc April 12, 2009 Abstract We give the classification of elements – respectively cyclic subgroups – DocID: 1pSnJ - View Document
	Representing groups on graphs Sagarmoy Dutta and Piyush P Kurur Department of Computer Science and Engineering, Indian Institute of Technology Kanpur, Kanpur, Uttar Pradesh, India {sagarmoy,ppk}@cse.iitk.ac.in DocID: 1oVzR - View Document
	REDUCED FUSION SYSTEMS OVER p-GROUPS WITH ABELIAN SUBGROUP OF INDEX p: II DAVID A. CRAVEN, BOB OLIVER, AND JASON SEMERARO Abstract. Let p be an odd prime, and let S be a p-group with a unique elementary abelian subgroup DocID: 1oTUU - View Document
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