Similarities between Elliptic-curve cryptography and Pairing-based cryptography
Elliptic-curve cryptography and Pairing-based cryptography have 3 things in common (in Unionpedia): ID-based encryption, Tate pairing, Weil pairing.
ID-based encryption
ID-based encryption, or identity-based encryption (IBE), is an important primitive of ID-based cryptography.
Elliptic-curve cryptography and ID-based encryption · ID-based encryption and Pairing-based cryptography ·
Tate pairing
In mathematics, Tate pairing is any of several closely related bilinear pairings involving elliptic curves or abelian varieties, usually over local or finite fields, based on the Tate duality pairings introduced by and extended by.
Elliptic-curve cryptography and Tate pairing · Pairing-based cryptography and Tate pairing ·
Weil pairing
In mathematics, the Weil pairing is a pairing (bilinear form, though with multiplicative notation) on the points of order dividing n of an elliptic curve E, taking values in nth roots of unity.
Elliptic-curve cryptography and Weil pairing · Pairing-based cryptography and Weil pairing ·
The list above answers the following questions
- What Elliptic-curve cryptography and Pairing-based cryptography have in common
- What are the similarities between Elliptic-curve cryptography and Pairing-based cryptography
Elliptic-curve cryptography and Pairing-based cryptography Comparison
Elliptic-curve cryptography has 95 relations, while Pairing-based cryptography has 16. As they have in common 3, the Jaccard index is 2.70% = 3 / (95 + 16).
References
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