![Cryptography / Algebra / Public-key cryptography / Pairing-based cryptography / Elliptic curves / Group theory / Analytic number theory / Weil pairing / Divisor / Pairing / Homomorphic signatures for network coding Cryptography / Algebra / Public-key cryptography / Pairing-based cryptography / Elliptic curves / Group theory / Analytic number theory / Weil pairing / Divisor / Pairing / Homomorphic signatures for network coding](https://www.pdfsearch.io/img/10b824d7cf4bd235f7dd43eb4de7107c.jpg) Date: 2013-09-23 05:41:31Cryptography Algebra Public-key cryptography Pairing-based cryptography Elliptic curves Group theory Analytic number theory Weil pairing Divisor Pairing Homomorphic signatures for network coding | | Exercises on pairings on elliptic curves Andreas Enge Leuven, Friday, 13 September 2013 Exercise 1 (Weil reciprocity). Let E : Y 2 = X 3 + X over F7 , f = Y , g = X−1 X−3 . Compute div f and div g, and verify that f Add to Reading ListSource URL: www.cosic.esat.kuleuven.beDownload Document from Source Website File Size: 118,79 KBShare Document on Facebook
|