# integer factorization and cryptography

i know that public key cryptography uses prime numbers, also know that two large(e.g. 100 digit) prime numbers (P, Q) are used as the private key, the product is a public key N = P * Q, and using prime numbers is because the factorization of N to obtain P , Q is sooo difficult and takes much time, i'm ok with that, but i'm puzzled why not just use any ordinary large non-prime numbers for P , Q and so the factorization of N will be still difficult because there would because now , there are not only 2 factors possible, but even more.

thanks....

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You can approach your question let's say for decryption purposes or efficient hashing. Anyways you want to minimize collisions (repeated outputs) and prime characteristics a good (not perfect) for that. You can take a very large non-prime, but once the computer knows it becomes relatively small compared with all the nums. that are bigger than it. –  Eric Fortis Dec 19 '10 at 2:42

I'm not really expert in cryptology (so if I'm wrong just tell me in a comment, and I'll promptly delete this answer), but I think it's because if you just use random large numbers you may get easily factorisable ones (i.e. you don't have to get up to really large prime numbers to get their prime factors). So just really big, guaranteed-prime numbers are used.

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I am not a crypto expert.

why not just use any ordinary large non-prime numbers for P , Q

Because there would be more factors. Integer factorization is an attack against public private key encryption. This attack exploits this very relation.

One could more easily find the relation and possible values with more common factors. It boils down to algebra.

N = P * Q

if P and Q are both Prime then N has 4 factors {N P Q 1}

However! if P and Q both share a factor of 2

N / 4 = P / 2 * Q / 2

If N could have been 0..2^4096 it is now 0..2^4094 and since 2 was a factor another large number was also a factor.

This means that I could find a scalar multiple, P', Q' of P,Q S.T. P',Q' < P,Q

I don't fully understand the concept myself but I believe this shows where i'm going with this.

You have to search a smaller space until you brute force the key.

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