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How do I check if an element a belongs to a specific cyclic group G of prime order, given the generator? Right now i simply generate all the elements in the group, save them into a container and check if the element is in it. This is the code im currently using to generate all the elements of the group:

public HashSet<BigInteger> group_elements(BigInteger g, BigInteger q) {

    HashSet<BigInteger> group = new HashSet<BigInteger>();

    BigInteger element = modPow(g,ONE,q);

    for (int i = 2; !group.contains(element); i++) {
        element = modPow(g, BigInteger.valueOf(i), q);

    return group;


And to see if a element is in the group i simply check:

if (group.contains(num)) { ... }

As you can see the language is Java

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Which language are you using and show us what you have tried – Adriaan Stander Mar 25 '10 at 18:22
Normally, I wouldn't just write out code, but your programming seems fine. It's the math of the problem which held you up, I think. – Rob Lachlan Mar 25 '10 at 18:59
Wait, what? Your group is the multiplicative group of order q, right? So any integer not divisible by q is an element of the group. [Or, if you're picking a representative for each residue class, as your code does, then the group is just {1, ... , q-1}.] Either way, you don't have to write so much code. :-) – ShreevatsaR Mar 25 '10 at 22:47
I assume that the questioner actually meant that G is the subgroup of (Z/q)* generated by g. – user287792 Mar 25 '10 at 23:07
I've deleted my answer, because I think I was wrong about what kind of group you're thinking of. Sorry for the confusion. – Rob Lachlan Mar 27 '10 at 17:13

Maybe you have some more information about what the group looks like.

If you know the order of the group G generated by g, and if q is prime (you only told us that the order of G is prime, but nothing about q) then you can check if an element x is in G by testing

1 = xord(G) mod q.

If q is not prime then this test does not work. A counter example, would be g = 22, q = 91, x = 53. Here g generates the subgroup with the elements {1, 22, 29}. x also has order 3, but is not an element of the subgroup generated by g.

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Check out the discrete logarithm problem and the algorithms for solving it.

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