Trigonometry in Galois fields

Results: 4



#Item
1Algebraic number theory / Modular arithmetic / TonelliShanks algorithm / Field theory / Cyclotomic unit / Trigonometry in Galois fields

The Tonelli-Shanks algorithm Ren´e Schoof, Roma 20 dicembre 2008 let p > 2 be prime. We describe an algorithm (due to A. Tonelli (Atti Accad. Linceiand D. Shanks (1970ies)) to compute a square root of a given sq

Add to Reading List

Source URL: www.mat.uniroma2.it

Language: English - Date: 2009-01-31 17:59:10
2Modular arithmetic / Algebraic number theory / Quadratic residue / Quadratic reciprocity / Prime number / Proofs of quadratic reciprocity / Trigonometry in Galois fields / Abstract algebra / Mathematics / Number theory

1 Appendices We collect some results that might be covered in a first course in algebraic number theory. A. Quadratic Reciprocity Via Gauss Sums

Add to Reading List

Source URL: www.math.uiuc.edu

Language: English - Date: 2009-03-16 23:36:02
3Modular arithmetic / Quadratic residue / Algebraic number theory / Number theory / Cyclic group / Finite field / XTR / Trigonometry in Galois fields / Abstract algebra / Mathematics / Algebra

STUFE OF A FINITE FIELD SAHIB SINGH Clarion State College, Clarion, Pennsylvania 16214

Add to Reading List

Source URL: www.fq.math.ca

Language: English - Date: 2010-08-19 18:35:33
4Algebra / Cyclotomic field / Algebraic number field / Prime number / Cyclotomic unit / Field / Trigonometry in Galois fields / Proofs of quadratic reciprocity / Abstract algebra / Algebraic number theory / Mathematics

FERMAT’S LAST THEOREM FOR REGULAR PRIMES KEITH CONRAD

Add to Reading List

Source URL: www.math.uconn.edu

Language: English - Date: 2004-10-01 23:05:14
UPDATE