Expand description
blstrs
An implementation of the BLS12-381 pairing-friendly elliptic curve construction.
Structs
- Bls12-381 engine
- This is an element of $\mathbb{G}_1$ represented in the affine coordinate space. It is ideal to keep elements in this representation to reduce memory usage and improve performance through the use of mixed curve model arithmetic.
- This is an element of $\mathbb{G}_1$ represented in the projective coordinate space.
- This is an element of $\mathbb{G}_2$ represented in the affine coordinate space. It is ideal to keep elements in this representation to reduce memory usage and improve performance through the use of mixed curve model arithmetic.
- This is an element of $\mathbb{G}_2$ represented in the projective coordinate space.
- This is an element of $\mathbb{G}_T$, the target group of the pairing function. As with $\mathbb{G}_1$ and $\mathbb{G}_2$ this group has order $q$.
- Represents results of a Miller loop, one of the most expensive portions of the pairing function.
MillerLoopResult
s cannot be compared with each other until.final_exponentiation()
is called, which is also expensive. - Aggregate pairings efficiently.
- Aggregate pairings efficiently.
- Represents an element of the scalar field $\mathbb{F}_q$ of the BLS12-381 elliptic curve construction.
Traits
- This traits enables reading and writing a compressed version.
Functions
- Execute a complete pairing operation
(p, q)
. - Returns true if all provided messages are distinctly unique, false otherwise.