Let G1 be a cyclic multiplicative group of order n. It is known that the computational Diffie–Hellman (CDH) problem is random self-reducible in G1 if φ(n) is known. That is, given g, gx ∈ G1 for some generator g and oracle access to a “Diffie-Hellman Problem solver” for g, it is possible to compute g1/x ∈ G1 in polynomial time (with which we can then solve the CDH problem w.r.t. any other generator). On the other hand, it is not clear if such a reduction exists when φ(n) is unknown. We exploit this “gap” to construct a novel cryptographic primitive, which we call an Oracle-based Group with Infeasible Inversion (O-GII). O-GIIs have applications in multiparty protocols. We demonstrate this by presenting a novel multi-party key agreement proto...