Struct libsecp256k1_core::curve::Jacobian [−][src]
Expand description
A group element of the secp256k1 curve, in jacobian coordinates.
Fields
x: Field
y: Field
z: Field
infinity: bool
Implementations
Set a group element (jacobian) equal to the point at infinity.
Set a group element (jacobian) equal to another which is given in affine coordinates.
Compare the X coordinate of a group element (jacobian).
Set r equal to the inverse of a (i.e., mirrored around the X axis).
Check whether a group element is the point at infinity.
Check whether a group element’s y coordinate is a quadratic residue.
Set r equal to the double of a. If rzr is not-NULL, r->z = a->z * *rzr (where infinity means an implicit z = 0). a may not be zero. Constant time.
Set r equal to the double of a. If rzr is not-NULL, r->z = a->z * *rzr (where infinity means an implicit z = 0).
Set r equal to the sum of a and b. If rzr is non-NULL, r->z = a->z * *rzr (a cannot be infinity in that case).
Set r equal to the sum of a and b (with b given in affine coordinates, and not infinity).
Set r equal to the sum of a and b (with b given in affine coordinates). This is more efficient than secp256k1_gej_add_var. It is identical to secp256k1_gej_add_ge but without constant-time guarantee, and b is allowed to be infinity. If rzr is non-NULL, r->z = a->z * *rzr (a cannot be infinity in that case).
Set r equal to the sum of a and b (with the inverse of b’s Z coordinate passed as bzinv).
Trait Implementations
Auto Trait Implementations
impl RefUnwindSafe for Jacobian
impl UnwindSafe for Jacobian
Blanket Implementations
Mutably borrows from an owned value. Read more
type Output = T
type Output = T
Should always be Self