quadratic residue
English edit
Noun edit
quadratic residue (plural quadratic residues)
- (number theory, modular arithmetic) For given positive integer n, any integer that is congruent to some square m2 modulo n.
- 1941, Derrick Henry Lehmer, Guide to Tables in the Theory of Numbers, National Research Council, page 52:
- There are many small tables of quadratic residues giving for the first few primes p the positive quadratic residues of p arranged in order of their size.
- 1991, John Stillwell (translator), Peter Gustav Lejeune Dirichlet, Lectures on Number Theory, [1863, Vorlesungen über Zahlentheorie], American Mathematical Society, London Mathematical Society, page 82,
- If we now make the assumption that q is a quadratic residue of all odd primes z not greater than 2m + 1, then it follows from earlier theorems (§37) that the prime q, since it is 1 (mod 8) and hence a quadratic residue of each power of 2, is also a quadratic residue of each number which has no odd prime factors except the prime numbers z
- 1999, Dinakar Ramakrishnan, Robert J. Valenza, Tsinghua University Press [清华大学出版社有限公司], Fourier Analysis on Number Fields, page 213,
- Of special importance here is the quadratic reciprocity law, which for primes p and q gives a precise relationship between the status of p as a quadratic residue mod q and the status of q as a quadratic residue mod p.
Usage notes edit
An integer satisfying the criterion is said to be a quadratic residue modulo n. The trivial case m = 0 is usually excluded.
Antonyms edit
- (antonym(s) of "integer expressible as a square modulo n"): quadratic nonresidue
Translations edit
integer that is congruent to the square of some other number, to a given modulus
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