Tate pairing
In mathematics, Tate pairing is any of several closely related
abelian varieties, usually over local or finite fields, based on the Tate duality pairings introduced by Tate (1958, 1963) and extended by Lichtenbaum (1969). Rück & Frey (1994)
applied the Tate pairing over finite fields to cryptography.
See also
References
- S2CID 122239828
- Rück, Hans-Georg; Frey, Gerhard (1994), "A remark concerning m-divisibility and the discrete logarithm in the divisor class group of curves", MR 1218343
- MR 0105420
- MR 0175892, archived from the originalon 2011-07-17
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