Encyclopedia > Square-free

  Article Content

Square-free

In mathematics, an integer n is called square-free iff no perfect square except 1 divides n. Equivalently, n is square-free iff in the prime factorization of n, no prime number occurs more than once. Another way of stating the same is that for every prime divisor p of n, the prime p does not divide n / p. For example, 10 is square-free but 20 is not.

Equivalent characterizations of square-free numbers

The integer n is square-free iff the factor ring Z / nZ (see modular arithmetic) is a product of fields. This follows from the Chinese remainder theorem and the fact that a ring of the form Z / kZ is a field if and only if k is a prime.

The positive integer n is square-free iff μ(n) ≠ 0, where μ denotes the Möbius function.

For every positive integer n, the set of all positive divisors of n becomes a partially ordered set if we use divisibility as the order relation: a <= b iff a divides b. This partially ordered set is always a lattice. It is a boolean algebra if and only if n is square-free.

Distribution of square-free numbers

If Q(x) denotes the number of square-free numbers less than or equal to x, then

<math>Q(x) = \frac{6x}{\pi^2} + O(\sqrt{x})</math>
(see pi and big O notation). The density of square-free numbers is therefore
<math>\lim_{x\to\infty} \frac{Q(x)}{x} = \frac{6}{\pi^2}</math>



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
Urethra

... more common in females than males. Urethritis is a common cause of dysuria[?] (pain when urinating). Related to urethritis is so called urethral syndrome[?] Passage of ...

 
 
 
This page was created in 29.3 ms