Add to ORKGResearch on efficient pairing implementation has focussed on reducing the loop length and on using high-degree twists. Existence of twists of degree larger than 2 is a very restrictive criterion but luckily constructions for pairing-friendly elliptic curves with such twists exist. In fact, Freeman, Scott and Teske showed in their overview paper that often the best known methods of constructing pairing-friendly elliptic curves over fields of large prime characteristic produce curves that admit twists of degree 3, 4 or 6. A few papers have presented explicit formulas for the doubling and the addition step in Miller’s algorithm, but the optimizations were all done for the Tate pairing with degree-2 twists, so the main usage of the high-degree...
The Weil and Tate pairings have found several new applications in cryptography. To efficiently imple...
Scott uses an efficiently computable isomorphism in order to optimize pairing computation on a parti...
Bilinear pairings have been recently used to construct cryptographic schemes with new and novel prop...
Research on efficient pairing implementation has focussed on reducing the loop length and on using h...
The Tate pairing has plenty of attractive applications, e.g., ID-based cryptosystems, short signatur...
This paper presents efficient formulas for computing cryptographic pairings on the curve y 2 = c x 3...
At Pairing 2010, Lauter et al\u27s analysis showed that Ate pairing computation in affine coordinate...
In this paper, a method for the efficient computation of Tate pairings on curves whichis a generaliz...
One of the challenges in the designing of pairing-based cryptographic protocols is to construct suit...
AbstractTextThis paper proposes new explicit formulas for the doubling and addition steps in Miller'...
In this paper we describe how to efficiently implement pairing calculation on supersingular genus~2 ...
In this paper, we propose an elaborate geometry approach to explain the group law on twisted Edwards...
International audienceText. This paper proposes new explicit formulas for the doubling and addition ...
International audienceThis paper proposes the computation of the Tate pairing, Ate pairing and its v...
The Weil and Tate pairings have found several new applications in cryptography. To efficiently imple...
Scott uses an efficiently computable isomorphism in order to optimize pairing computation on a parti...
Bilinear pairings have been recently used to construct cryptographic schemes with new and novel prop...
Research on efficient pairing implementation has focussed on reducing the loop length and on using h...
The Tate pairing has plenty of attractive applications, e.g., ID-based cryptosystems, short signatur...
This paper presents efficient formulas for computing cryptographic pairings on the curve y 2 = c x 3...
At Pairing 2010, Lauter et al\u27s analysis showed that Ate pairing computation in affine coordinate...
In this paper, a method for the efficient computation of Tate pairings on curves whichis a generaliz...
One of the challenges in the designing of pairing-based cryptographic protocols is to construct suit...
AbstractTextThis paper proposes new explicit formulas for the doubling and addition steps in Miller'...
In this paper we describe how to efficiently implement pairing calculation on supersingular genus~2 ...
In this paper, we propose an elaborate geometry approach to explain the group law on twisted Edwards...
International audienceText. This paper proposes new explicit formulas for the doubling and addition ...
International audienceThis paper proposes the computation of the Tate pairing, Ate pairing and its v...
The Weil and Tate pairings have found several new applications in cryptography. To efficiently imple...
Scott uses an efficiently computable isomorphism in order to optimize pairing computation on a parti...
Bilinear pairings have been recently used to construct cryptographic schemes with new and novel prop...