A subexponential-time algorithm for computing discrete logarithms overGF(p^2)
- 1 July 1985
- journal article
- Published by Institute of Electrical and Electronics Engineers (IEEE) in IEEE Transactions on Information Theory
- Vol. 31 (4) , 473-481
- https://doi.org/10.1109/tit.1985.1057075
Abstract
An algorithm for computing discrete logarithms over GF(p^{2}), wherepis a prime, in subexponential time is described. The algorithm is similar to the Merkle-Adleman algorithm for computing logarithms over GF(p), but it uses quadratic fields as the appropriate algebraic structure. It also makes use of the idea of a virtual spanning set due to Hellman and Reyneri for computing discrete logarithms over GF(p^{m}), formgrowing andpfixed.Keywords
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