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MOC
2000
2000
Using number fields to compute logarithms in finite fields
We describe an adaptation of the number field sieve to the problem of computing logarithms in a finite field. We conjecture that the running time of the algorithm, when restricted to finite fields of an arbitrary but fixed degree, is Lq[1/3; (64/9)1/3 + o(1)], where q is the cardinality of the field, Lq[s; c] = exp(c(log q)s(log log q)1-s), and the o(1) is for q . The number field sieve factoring algorithm is conjectured to factor a number the size of q in the same amount of time.
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| Added | 19 Dec 2010 |
| Updated | 19 Dec 2010 |
| Type | Journal |
| Year | 2000 |
| Where | MOC |
| Authors | Oliver Schirokauer |
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