The security and performance of pairing based cryptography has provoked a large volume of research, in part because of the exciting new cryptographic schemes that it underpins. We re-examine how one should implement pairings over ordinary elliptic curves for various practical levels of security. We conclude, contrary to prior work, that the Tate pairing is more efficient than the Weil pairing for all such security levels. This is achieved by using efficient exponentiation techniques in the cyclotomic subgroup backed by efficient squaring routines within the same subgroup
Abstract Recently there has been an explosion of interest in the use of pairings on elliptic curvesi...
We describe fast new algorithms to implement recent cryptosystems based on the Tate pairing. In part...
The output of the Tate pairing on an elliptic curve over a nite eld is an element in the multipli...
The security and performance of pairing based cryptography has provoked a large volume of research, ...
Abstract. The security and performance of pairing based cryptography has provoked a large volume of ...
In number theoretic cryptography there is always the problem of scaling-up security to a higher leve...
The most significant pairing-based cryptographic protocol to be proposed so far is undoubtedly the ...
pairing implementation, high-security pairings, hyperelliptic curves, group law, Jacobian arithmetic...
Abstract. Pairings are typically implemented using ordinary pairing-friendly elliptic curves. The tw...
Recent progress on pairing implementation has made certain pairings extremely simple and fast to com...
The most powerful known primitive in public-key cryptography is undoubtedly elliptic curve pairings....
Pairing-based cryptography has been employed to obtain several advantageous cryptographic protocols....
The Weil and Tate pairings have found several new applications in cryptography. To efficiently imple...
Abstract. In this paper we examine the hard problems underlying asymmetric pairings, their precise r...
Analyse, arithmétique et géométrie Pairings were first studied as potential attacks on elliptic curv...
Abstract Recently there has been an explosion of interest in the use of pairings on elliptic curvesi...
We describe fast new algorithms to implement recent cryptosystems based on the Tate pairing. In part...
The output of the Tate pairing on an elliptic curve over a nite eld is an element in the multipli...
The security and performance of pairing based cryptography has provoked a large volume of research, ...
Abstract. The security and performance of pairing based cryptography has provoked a large volume of ...
In number theoretic cryptography there is always the problem of scaling-up security to a higher leve...
The most significant pairing-based cryptographic protocol to be proposed so far is undoubtedly the ...
pairing implementation, high-security pairings, hyperelliptic curves, group law, Jacobian arithmetic...
Abstract. Pairings are typically implemented using ordinary pairing-friendly elliptic curves. The tw...
Recent progress on pairing implementation has made certain pairings extremely simple and fast to com...
The most powerful known primitive in public-key cryptography is undoubtedly elliptic curve pairings....
Pairing-based cryptography has been employed to obtain several advantageous cryptographic protocols....
The Weil and Tate pairings have found several new applications in cryptography. To efficiently imple...
Abstract. In this paper we examine the hard problems underlying asymmetric pairings, their precise r...
Analyse, arithmétique et géométrie Pairings were first studied as potential attacks on elliptic curv...
Abstract Recently there has been an explosion of interest in the use of pairings on elliptic curvesi...
We describe fast new algorithms to implement recent cryptosystems based on the Tate pairing. In part...
The output of the Tate pairing on an elliptic curve over a nite eld is an element in the multipli...