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 Date: 2013-10-18 10:58:33Algebraic number theory Quadratic forms Field theory Linear algebra Real algebraic geometry Quadratic field Discriminant Algebraic number field Factorization Field extension Elliptic curve |
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MATHEMATICSof computation VOLUME 41. NUMBER 163 JULY 1983, PAGESClass Groups of Complex Quadratic Fields By R. J. Schoof
![Primes Represented by Quadratic Forms Peter Stevenhagen Begin again with the representation of the prime p = x2 + y 2 as the sum of squares. We write p = ππ, where π = x + yi ∈ Z[i]; since Z[i] has a finite unit gro](https://www.pdfsearch.io/img/f13bbd81567e39e9cd1eb4d542900ada.jpg "Primes Represented by Quadratic Forms Peter Stevenhagen Begin again with the representation of the prime p = x2 + y 2 as the sum of squares. We write p = ππ, where π = x + yi ∈ Z[i]; since Z[i] has a finite unit gro")
