Computational Tools for Group Theory Jeffrey Barr

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Date: 2006-11-20 23:07:22 Cyclic group Center Subgroup Order Abelian group Normal subgroup Frattini subgroup Free group Abstract algebra Algebra Group theory		Computational Tools for Group Theory Jeffrey Barr Add to Reading List Source URL: www.groovypower.com Download Document from Source Website File Size: 38,79 KB Share Document on Facebook

	Measuring small subgroup attacks against Diffie-Hellman Luke Valenta∗ , David Adrian† , Antonio Sanso‡ , Shaanan Cohney∗ , Joshua Fried∗ , Marcella Hastings∗ , J. Alex Halderman† , Nadia Heninger∗ ∗ Uni DocID: 1xVhf - View Document
	The Weierstrass subgroup of a curve has maximal rank. Martine Girard, David R. Kohel and Christophe Ritzenthaler ∗†‡ Abstract We show that the Weierstrass points of the generic curve of genus g over an algebraical DocID: 1vrsl - View Document
	THE SCHUR–ZASSENHAUS THEOREM KEITH CONRAD When N is a normal subgroup of G, can we reconstruct G from N and G/N ? In general, no. For instance, the groups Z/(p2 ) and Z/(p) × Z/(p) (for prime p) are nonisomorphic, but DocID: 1vr1L - View Document
	SOME EXAMPLES IN THE THEORY OF SUBGROUP GROWTH ¨ ller and Jan-Christoph Schlage-Puchta Thomas W. Mu Abstract. By estimating the subgroup numbers associated with various classes of large groups, we exhibit a number of n DocID: 1vpks - View Document
	Week 4 (due April 30) Reading: Srednicky, sections 69, 70. See also a book by Howard Georgi, ”Lie algebras in particle physics”. 1. (a) (10 points) The complex symplectic group Sp(2N, C) is a complex subgroup of GL(2 DocID: 1vpdH - View Document