Reduced residue system
In mathematics, a subset R of the integers is called a reduced residue system modulo n if:
- gcd(r, n) = 1 for each r in R,
- R contains φ(n) elements,
- no two elements of R are congruent modulo n.[1][2]
Here φ denotes Euler's totient function.
A reduced residue system modulo n can be formed from a complete residue system modulo n by removing all integers not relatively prime to n. For example, a complete residue system modulo 12 is {0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11}. The so-called totatives 1, 5, 7 and 11 are the only integers in this set which are relatively prime to 12, and so the corresponding reduced residue system modulo 12 is {1, 5, 7, 11}. The cardinality of this set can be calculated with the totient function: φ(12) = 4. Some other reduced residue systems modulo 12 are:
- {13,17,19,23}
- {−11,−7,−5,−1}
- {−7,−13,13,31}
- {35,43,53,61}
Facts
See also
Notes
- Long (1972, p. 85)
- Pettofrezzo & Byrkit (1970, p. 104)
References
- Long, Calvin T. (1972), Elementary Introduction to Number Theory (2nd ed.), Lexington: D. C. Heath and Company, LCCN 77171950
- Pettofrezzo, Anthony J.; Byrkit, Donald R. (1970), Elements of Number Theory, Englewood Cliffs: Prentice Hall, LCCN 71081766
External links
- Residue systems at PlanetMath
- Reduced residue system at MathWorld
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