Fundamental discriminant

In mathematics, a fundamental discriminant D is an integer invariant in the theory of integral binary quadratic forms. If Q(x, y) = ax² + bxy + cy² is a quadratic form with integer coefficients, then D = b² − 4ac is the discriminant of Q(x, y). Conversely, every integer D with D ≡ 0, 1 (mod 4) is the discriminant of some binary quadratic form with integer coefficients. Thus, all such integers are referred to as discriminants in this theory.

There are explicit congruence conditions that give the set of fundamental discriminants. Specifically, D is a fundamental discriminant if and only if one of the following statements holds

• D ≡ 1 (mod 4) and is square-free,
• D = 4m, where m ≡ 2 or 3 (mod 4) and m is square-free.

The first eleven positive fundamental discriminants are:

1, 5, 8, 12, 13, 17, 21, 24, 28, 29, 33 (sequence A003658 in the OEIS).

The first eleven negative fundamental discriminants are:

−3, −4, −7, −8, −11, −15, −19, −20, −23, −24, −31 (sequence A003657 in the OEIS).

Connection with quadratic fields

There is a connection between the theory of integral binary quadratic forms and the arithmetic of quadratic number fields. A basic property of this connection is that D₀ is a fundamental discriminant if, and only if, D₀ = 1 or D₀ is the discriminant of a quadratic number field. There is exactly one quadratic field for every fundamental discriminant D₀ ≠ 1, up to isomorphism. This is the reason why some authors consider 1 not to be a fundamental discriminant, although one may interpret D₀ = 1 as the discriminant of the quadratic algebra consisting of two copies of the rational field.

Factorization

Fundamental discriminants may also be characterized by their factorization into positive and negative prime powers. Define the set

${\displaystyle S=\{-8,-4,8,-3,5,-7,-11,13,17,-19,\;\ldots \}}$ 

where the prime numbers congruent to 1 mod 4 are positive and those congruent to 3 mod 4 are negative. Then, a number D₀ ≠ 1 is a fundamental discriminant if, and only if, it is the product of pairwise relatively prime members of S.

References

• Henri Cohen (1993). A Course in Computational Algebraic Number Theory. Graduate Texts in Mathematics. Vol. 138. Berlin, New York: Springer-Verlag. ISBN 3-540-55640-0. MR 1228206.
• Duncan Buell (1989). Binary quadratic forms: classical theory and modern computations. Springer-Verlag. p. 69. ISBN 0-387-97037-1.
• Don Zagier (1981). Zetafunktionen und quadratische Körper. Berlin, New York: Springer-Verlag. ISBN 978-3-540-10603-6.

See also

• Quadratic integer