What are examples of groups, where DLP (discrete logarithm problem) is hard?
Two obvious ones are: integers modulo $p$ ($p$ being prime) and elliptic curves over finite fields. What are the others?
What are examples of groups, where DLP (discrete logarithm problem) is hard?
Two obvious ones are: integers modulo $p$ ($p$ being prime) and elliptic curves over finite fields. What are the others?