RSA algorithm: Difference between revisions
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That is, the encrypt/decrypt pair of operations always give the correct result. | That is, the encrypt/decrypt pair of operations always give the correct result. | ||
== Proof == | |||
The proof is based on theorems proved by [[Fermat]], back in the 17th century, | The proof is based on theorems proved by [[Fermat]], back in the 17th century, |
Revision as of 20:23, 24 October 2008
The RSA algorithm is the best known public key encryption algorithm. Like any public key system, it can be used to create digital signatures as well as for secrecy.
It is named for its inventors Ron Rivest, Adi Shamir and Leonard Adeleman. The original paper defining it, "A Method for Obtaining Digital Signatures and Public-Key Cryptosystems" by those three authors is still available[1].
How it works
To generate an RSA key pair, the system first finds two primes p, q and the product N = pq. Take p-1 and q-1 and find the least common multiple T = lcm( p-1, q-1). Then choose d, e such that d*e == 1 modulo T. The public key is then the pair (N,e) and the private key (N,d).
The strength parameter of the system is the length of N in bits. As of 2008, 1024 bits is considered secure but some users choose larger sizes to be on the safe side.
Using t for plaintext and c for ciphertext, encryption is then:
c = te modulo N
and decryption, using m for the decrypted message is:
m = cd modulo N
so we have:
m = (te)d modulo N m = tde modulo N
whence (via the proof below)
m = t modulo N
That is, the encrypt/decrypt pair of operations always give the correct result.
Proof
The proof is based on theorems proved by Fermat, back in the 17th century,
For prime p and any x:
xp == x modulo p
and for non-zero x:
xp-1 == 1 modulo p
Whence, for any k and non-zero x:
xk(p-1) == 1 modulo p
so with two primes and x non-zero modulo both:
x(p-1)(q-1) == 1 modulo p or modulo q, hence modulo pq xk(p-1)(q-1) == 1 modulo pq
Whether or not x is zero modulo either prime, we get:
xk(p-1)(q-1)+1 == x modulo pq
but we have:
de == 1 mod T de = k(p-1)(q-1)+1 for some k
and
m = tde modulo N which is modulo pq
so
m = t in all cases
Implementation differences
RSA and factoring
Given an efficient solution to the integer factorisation problem, breaking RSA would become trivial. The attacker is assumed to have the public key (N,e). If he can factor N, he gets p, q and therefore p-1, q-1 and T. He knows e and can calculate its inverse mod T. That gives him d and he already has N, so now he knows the private key (N,d). The cryptosystem would be rendered worthless.
The problem with that is that no efficient solution for factoring is known, despite considerable effort by quite a few people over several decades to find one. It seems possible no such algorithm exists, though no-one has proven that.