Cubic reciprocity

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In mathematics, cubic reciprocity refers to various results connecting the solvability of two related cubic equations in modular arithmetic. It is a generalisation of the concept of quadratic reciprocity.

Algebraic setting

The law of cubic reciprocity is most naturally expressed in terms of the Eisenstein integers, that is, the ring E of complex numbers of the form

z=a+b\,\omega

where and a and b are integers and

\omega ={\frac {1}{2}}(-1+i{\sqrt {3}})=e^{2\pi i/3}

is a complex cube root of unity.

If $\pi$ is a prime element of E of norm P and $\alpha$ is an element coprime to $\pi$ , we define the cubic residue symbol $\left({\frac {\alpha }{\pi }}\right)_{3}$ to be the cube root of unity (power of $\omega$ ) satisfying

\alpha ^{(P-1)/3}\equiv \left({\frac {\alpha }{\pi }}\right)_{3}\mod \pi

We further define a primary prime to be one which is congruent to -1 modulo 3. Then for distinct primary primes $\pi$ and $\theta$ the law of cubic reciprocity is simply

\left({\frac {\pi }{\theta }}\right)_{3}=\left({\frac {\theta }{\pi }}\right)_{3}

with the supplementary laws for the units and for the prime $1-\omega$ of norm 3 that if $\pi =-1+3(m+n\omega )$ then

\left({\frac {\omega }{\pi }}\right)_{3}=\omega ^{m+n}

\left({\frac {1-\omega }{\pi }}\right)_{3}=\omega ^{2m}

References

David A. Cox, Primes of the form $x^{2}+ny^{2}$ , Wiley, 1989, ISBN 0-471-50654-0.
K. Ireland and M. Rosen, A classical introduction to modern number theory, 2nd ed, Graduate Texts in Mathematics 84, Springer-Verlag, 1990.
Franz Lemmermeyer, Reciprocity laws: From Euler to Eisenstein, Springer Verlag, 2000, ISBN 3-540-66957-4.

External links

Cubic Reciprocity Theorem from MathWorld

Cubic reciprocity

Algebraic setting

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