The Discrete Logarithm problem in the ElGamal cryptosystem over the abelian group U(n) Where n= p^m,or 2p^m

This study is mainly about the discrete logarithm problem in the ElGamal cryptosystem over the abelian group U(n) where n is one of the following forms p^m, or 2p^m where p is an odd large prime and m is a positive integer. It is another good way to deal with the ElGamal Cryptosystem using that abelian group U(n)={x: x is a positive integer such that x<n and gcd(n,x)=1} in the setting of the discrete logarithm problem . Since I show in this paper that this new study maintains equivalent (or better) security with the original ElGamal cryptosystem(invented by Taher ElGamal in 1985)[1], that works over the finite cyclic group of the finite field. It gives a better security because theoretically ElGamal Cryptosystem with U(p^m) or with U(2p^m) is much more secure since the possible solutions for the discrete logarithm will be increased, and that would make this cryptosystem is hard to broken even with thousands of years.

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