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PAIRING
2007
Springer

The Tate Pairing Via Elliptic Nets

14 years 6 months ago
The Tate Pairing Via Elliptic Nets
We derive a new algorithm for computing the Tate pairing on an elliptic curve over a finite field. The algorithm uses a generalisation of elliptic divisibility sequences known as elliptic nets, which are maps from Zn to a ring that satisfy a certain recurrence relation. We explain how an elliptic net is associated to an elliptic curve and reflects its group structure. Then we give a formula for the Tate pairing in terms of values of the net. Using the recurrence relation we can calculate these values in linear time. Computing the Tate pairing is the bottleneck to efficient pairing-based cryptography. The new algorithm has time complexity comparable to Miller’s algorithm, and should yield to further optimisation. Key words: Tate pairing, elliptic curve, elliptic divisibility sequence, elliptic net, Miller’s algorithm, pairing-based cryptography.
Katherine E. Stange
Added 09 Jun 2010
Updated 09 Jun 2010
Type Conference
Year 2007
Where PAIRING
Authors Katherine E. Stange
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