Pollard’s P-1 Factorization Algorithm
July 21, 2009
Fermat’s little theorem states that for any prime number , and any other number , . Rearranging terms, we have , which means that divides the left-hand side of the equation, thus is a factor of the left-hand side.
John Pollard used this idea to develop a factoring method in 1974. His idea is to choose a very large number and see if it has any factors in common with , thus giving a factor of . A systematic way to test many very large numbers is by taking large factorials, which have many small factors within them. Thus, Pollard’s factorization algorithm is this:
1) Choose , which is known as the smoothness bound, and calculate the product of the primes to by .
2) Choose a random integer such that .
3) Calculate . If is strictly greater than 1, then it is a non-trivial factor of . Otherwise, continue to the next step.
4) Calculate . If , then is a non-trivial factor of . If , go to Step 1 and choose a larger . If , go back to Step 2 and choose another .
In Step 4, you can quit with failure instead of returning to Step 1 if becomes too large, where “too large” is probably somewhere around ; in that case, you will need to continue with some other factoring algorithm.
Your task is to write a function that factors integers by Pollard’s method. What are the factors of ? When you are finished, you are welcome to read or run a suggested solution, or to post your solution or discuss the exercise in the comments below.
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