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Revision as of 16:17, 30 December 2010

Any subset R of the set of integers is called a reduced residue system modulo n if

  1. (r, n) = 1 for each r contained in R;
  2. R contains φ {\displaystyle \varphi } (n) elements;
  3. no two elements of R are congruent modulo n.

Here φ {\displaystyle \varphi } 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}. 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}. Note that the cardinality of this set is φ ( 12 ) = 4 {\displaystyle \varphi (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

  • If { r 1 , r 2 , , r φ ( n ) } {\displaystyle \{r_{1},r_{2},\dots ,r_{\varphi (n)}\}} is a reduced residue system with n > 2, then r i 0 ( mod n ) {\displaystyle \sum r_{i}\equiv 0{\pmod {n}}} .

See also

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