Having searched, I've found myself confused by the use of P and G in the Diffie Hellman algorithm. There is requirementy that P is prime, and G is a primitive root of P.
I understand the security is based on the difficulty of factoring the result of two very large prime numbers, so I have no issue with that. However, there appears to be little available information on the purpose of G being a primitive root of P. Can anyone answer why this requirement exists (with references if possible)? Does it just increase the security? Given that shared keys can be created with apparently any combination of p and g, even ones that are not prime, I find this intriguing. It can surely only be for security? If so, how does it increase it?
Thanks in advance