Add to ORKGWe present a general framework for constructing families of elliptic curves of prime order with prescribed embedding degree. We demonstrate this method by constructing curves with embedding degree k = 10, which solves an open problem posed by Boneh, Lynn, and Shacham. We show that our framework incorporates existing constructions for k = 3, 4, 6, and 12, and we give evidence that the method is unlikely to produce infinite families of curves with embedding degree k > 12
Elliptic curves with small embedding degree and large prime-order subgroup are key ingredients for i...
In this paper, we extend the method of Scott and Barreto and present an explicit and simple algorith...
Scott uses an efficiently computable isomorphism in order to optimize pairing computation on a parti...
Abstract. We present a general framework for constructing families of elliptic curves of prime order...
We present a general framework for constructing families of elliptic curves of prime order with pres...
cryptography, pairings, elliptic curves, embedding degree We present a general method for constructi...
Abstract. Pairing-based cryptosystems depend on the existence of groups where the Decision Diffie-He...
Previously known techniques to construct pairing-friendly curves of prime or near-prime order are re...
Previously known techniques to construct pairing-friendly curves of prime or near-prime order are re...
Previously known techniques to construct pairing-friendly curves of prime or near-prime order are re...
Previously known techniques to construct pairing-friendly curves of prime or near-prime order are re...
Previously known techniques to construct pairing-friendly curves of prime or near-prime order are re...
Previously known techniques to construct pairing-friendly curves of prime or near-prime order are re...
Abstract. Elliptic curves with small embedding degree and large prime-order subgroup are key ingredi...
Previously known techniques to construct pairing-friendly curves of prime or near-prime order are re...
Elliptic curves with small embedding degree and large prime-order subgroup are key ingredients for i...
In this paper, we extend the method of Scott and Barreto and present an explicit and simple algorith...
Scott uses an efficiently computable isomorphism in order to optimize pairing computation on a parti...
Abstract. We present a general framework for constructing families of elliptic curves of prime order...
We present a general framework for constructing families of elliptic curves of prime order with pres...
cryptography, pairings, elliptic curves, embedding degree We present a general method for constructi...
Abstract. Pairing-based cryptosystems depend on the existence of groups where the Decision Diffie-He...
Previously known techniques to construct pairing-friendly curves of prime or near-prime order are re...
Previously known techniques to construct pairing-friendly curves of prime or near-prime order are re...
Previously known techniques to construct pairing-friendly curves of prime or near-prime order are re...
Previously known techniques to construct pairing-friendly curves of prime or near-prime order are re...
Previously known techniques to construct pairing-friendly curves of prime or near-prime order are re...
Previously known techniques to construct pairing-friendly curves of prime or near-prime order are re...
Abstract. Elliptic curves with small embedding degree and large prime-order subgroup are key ingredi...
Previously known techniques to construct pairing-friendly curves of prime or near-prime order are re...
Elliptic curves with small embedding degree and large prime-order subgroup are key ingredients for i...
In this paper, we extend the method of Scott and Barreto and present an explicit and simple algorith...
Scott uses an efficiently computable isomorphism in order to optimize pairing computation on a parti...