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 Date: 2009-01-31 17:59:10Algebraic number theory Modular arithmetic TonelliShanks algorithm Field theory Cyclotomic unit Trigonometry in Galois fields |
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| First Page | Document Content | |
|---|---|---|
Date: 2009-01-31 17:59:10Algebraic number theory Modular arithmetic TonelliShanks algorithm Field theory Cyclotomic unit Trigonometry in Galois fields |
Add to Reading List |
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
![Galois representations associated to modular forms Johan BosmanThese are notes from a talk given at an intercity seminar arithmetic geometry. The main reference is [1], where more details and further referenc](https://www.pdfsearch.io/img/4656e8ab1fbbdfddc09d4999d72c9527.jpg "Galois representations associated to modular forms Johan BosmanThese are notes from a talk given at an intercity seminar arithmetic geometry. The main reference is [1], where more details and further referenc")
![Arithmetic and Diophantine Geometry 14Gxx [1] Matthew H. Baker, Enrique Gonz´alez-Jim´enez, Josep Gonz´alez, and Bjorn Poonen, Finiteness results for modular curves of genus at least 2, Amer. J. Math), no.](https://www.pdfsearch.io/img/33a05301fd664d9e6e8a6c656cf07bcf.jpg "Arithmetic and Diophantine Geometry 14Gxx [1] Matthew H. Baker, Enrique Gonz´alez-Jim´enez, Josep Gonz´alez, and Bjorn Poonen, Finiteness results for modular curves of genus at least 2, Amer. J. Math), no.")
