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Difference between revisions of "Cubic residue"

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(Category:Number theory)
(→‎Comments: see also Power residue)
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From [[class field theory]] one obtains, e.g., that $2$ is a cubic residue modulo a prime number $p$ if and only if $p$ can be written in the form $p=x^2+27y^2$ with integers $x$ and $y$.  
 
From [[class field theory]] one obtains, e.g., that $2$ is a cubic residue modulo a prime number $p$ if and only if $p$ can be written in the form $p=x^2+27y^2$ with integers $x$ and $y$.  
  
See also [[Quadratic residue]]; [[Reciprocity laws]]; [[Complete system of residues]]; [[Reduced system of residues]].
+
See also [[Quadratic residue]]; [[Power residue]]; [[Reciprocity laws]]; [[Complete system of residues]]; [[Reduced system of residues]].
  
 
[[Category:Number theory]]
 
[[Category:Number theory]]

Revision as of 21:10, 16 October 2014

modulo $m$

An integer $a$ for which the congruence $x^3=a$ ($\bmod\,m$) is solvable. If the congruence has no solution, $a$ is called a cubic non-residue modulo $m$. If the modulus is a prime number $p$, the congruence $x^3\equiv a$ ($\bmod\,p$) may be checked for solvability using Euler's criterion: The congruence $x^3\equiv a$ ($\bmod\,p$), $(a,p)=1$, is solvable if and only if

$$a^{(p-1)/q}\equiv1\pmod p,$$

where $q=(3,p-1)$. When the condition is satisfied, the congruence has exactly $q$ distinct solutions modulo $p$. It follows from the criterion, in particular, that for a prime number $p$, the sequence of numbers $1,\dots,p-1$ contains exactly $(q-1)(p-1)/q$ cubic non-residues and $(p-1)/q$ cubic residues modulo $p$.


Comments

From class field theory one obtains, e.g., that $2$ is a cubic residue modulo a prime number $p$ if and only if $p$ can be written in the form $p=x^2+27y^2$ with integers $x$ and $y$.

See also Quadratic residue; Power residue; Reciprocity laws; Complete system of residues; Reduced system of residues.

How to Cite This Entry:
Cubic residue. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Cubic_residue&oldid=33705
This article was adapted from an original article by S.A. Stepanov (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article