Encyclopedia > Gaussian integer

  Article Content

Gaussian integer

A Gaussian integer is a complex number whose real and imaginary part are both integers. The Gaussian integers, with ordinary addition and multiplication of complex numbers, form an integral domain, usually written as Z[i]. This is a Euclidean domain which cannot be turned into an ordered ring[?].

The norm of a Gaussian integer is the natural number defined as N(a + bi) = a2 + b2. The norm is multiplicative, i.e. N(zw) = N(z)N(w). The units of Z[i] are therefore precisely those elements with norm 1, i.e. the elements 1, -1, i and -i.

The prime elements of Z[i] are also known as Gaussian primes. Some prime numbers are not Gaussian primes; for example 2=(1+i)(1-i) and 5=(2+i)(2-i). Those prime numbers which are congruent to 3 mod 4 are Gaussian primes; those which are congruent to 1 mod 4 are not. This is because primes of the form 4k+1 can always be written as the sum of two squares, so we have p = a2 + b2 = (a + bi)(a - bi). If the norm of a Gaussian integer z is a prime number, then z must be a Gaussian prime, since every non-trivial factorization of z would yield a non-trivial factorization of the norm. So for example 2 + 3i is a Gaussian prime since its norm is 4 + 9 = 13.

The ring of Gaussian integers is the integral closure of Z in the field Q(i) consisting of the complex numbers whose real and imaginary part are both rational.



All Wikipedia text is available under the terms of the GNU Free Documentation License

 
  Search Encyclopedia

Search over one million articles, find something about almost anything!
 
 
  
  Featured Article
Kings Park, New York

... are 5,480 households out of which 36.4% have children under the age of 18 living with them, 65.1% are married couples living together, 8.7% have a female householder with ...

 
 
 
This page was created in 23.1 ms