Asia Pacific Mathematics Newsletter 1 ClassicalReciprocity Reciprocity Laws Classical

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Date: 2014-11-28 01:26:36 Algebraic number theory Modular arithmetic Field theory Number theory Quadratic residue Reciprocity law Algebraic number field Quadratic reciprocity Quartic reciprocity Abstract algebra Mathematics Algebra		Asia Pacific Mathematics Newsletter 1 ClassicalReciprocity Reciprocity Laws Classical Add to Reading List Source URL: www.asiapacific-mathnews.com Download Document from Source Website File Size: 177,54 KB Share Document on Facebook

	How Euler Did It by Ed Sandifer Odd Perfect Numbers November 2006 The subject we now call “number theory” was not a very popular one in the 18th century. Euler wrote almost a hundred papers on the subject, but the fi DocID: 1pnfE - View Document
	On certain imaginary abelian 2-extensions with λ2 = μ2 = ν2 = 0 Hisao Taya (Miyagi University of Education) and Gen Yamamoto (Tokyo Denki University) November 13, 2008, in Sendai, Japan DocID: 1orT7 - View Document
	DEPARTMENT OF MATHEMATICS UNIVERSITY OF NIJMEGEN The Netherlands Cubic reciprocity and explicit primality tests for h · 3k ± 1 DocID: 1lZ5o - View Document
	Some computational experiments in number theory Wieb Bosma Mathematisch Instituut Radboud University Nijmegen Nijmegen, the Netherlands DocID: 1lhil - View Document
	Explicit Primality Criteria for h #2k ± 1 Wieb Bosma Mathematics of Computation, Vol. 61, No. 203, Special Issue Dedicated to Derrick Henry Lehmer. (Jul., 1993), ppStable URL: http://links.jstor.org/sici?sici= DocID: 1l3Gs - View Document