Unique factorization

From Citizendium
Revision as of 17:01, 6 May 2007 by imported>Michael Hardy (The first sentence was not even a sentence and lacked any context setting. This article certainly needs work. Probably I'll be back.)
Jump to navigation Jump to search

In mathematics, the unique factorization theorem, also known as the fundamental theorem of arithmetic states that every integer can be expressed as a product of prime numbers in essentially only one way.

Proof

Every integer can be written in a unique way as a product of prime factors, up to reordering. To see why this is true, assume that can be written as a product of prime factors in two ways

We may now use a technique known as mathematical induction to show that the two prime decompositions are really the same.

Consider the prime factor . We know that

Using the second definition of prime numbers, it follows that divides one of the q-factors, say . Using the first definition, is in fact equal to

Now, if we set , we may write

and

In other words, is the product of all the 's except .

Continuing in this way, we obtain a sequence of numbers where each is obtained by dividing by a prime factor. In particular, we see that and that there is some permutation ("rearrangement") σ of the indices such that . Said differently, the two factorizations of N must be the same up to a possible rearrangement of terms.