Trait ff::PrimeField

source ·
pub trait PrimeField: Field + From<u64> {
    type Repr: Copy + Default + Send + Sync + 'static + AsRef<[u8]> + AsMut<[u8]>;

    const NUM_BITS: u32;
    const CAPACITY: u32;
    const S: u32;

    fn from_repr(repr: Self::Repr) -> CtOption<Self>;
    fn to_repr(&self) -> Self::Repr;
    fn is_odd(&self) -> Choice;
    fn multiplicative_generator() -> Self;
    fn root_of_unity() -> Self;

    fn from_str_vartime(s: &str) -> Option<Self> { ... }
    fn from_repr_vartime(repr: Self::Repr) -> Option<Self> { ... }
    fn is_even(&self) -> Choice { ... }
}
Expand description

This represents an element of a prime field.

Required Associated Types§

The prime field can be converted back and forth into this binary representation.

Required Associated Constants§

How many bits are needed to represent an element of this field.

How many bits of information can be reliably stored in the field element.

This is usually Self::NUM_BITS - 1.

An integer s satisfying the equation 2^s * t = modulus - 1 with t odd.

This is the number of leading zero bits in the little-endian bit representation of modulus - 1.

Required Methods§

Attempts to convert a byte representation of a field element into an element of this prime field, failing if the input is not canonical (is not smaller than the field’s modulus).

The byte representation is interpreted with the same endianness as elements returned by PrimeField::to_repr.

Converts an element of the prime field into the standard byte representation for this field.

The endianness of the byte representation is implementation-specific. Generic encodings of field elements should be treated as opaque.

Returns true iff this element is odd.

Returns a fixed multiplicative generator of modulus - 1 order. This element must also be a quadratic nonresidue.

It can be calculated using SageMath as GF(modulus).primitive_element().

Implementations of this method MUST ensure that this is the generator used to derive Self::root_of_unity.

Returns the 2^s root of unity.

It can be calculated by exponentiating Self::multiplicative_generator by t, where t = (modulus - 1) >> Self::S.

Provided Methods§

Interpret a string of numbers as a (congruent) prime field element. Does not accept unnecessary leading zeroes or a blank string.

Security

This method provides no constant-time guarantees.

Attempts to convert a byte representation of a field element into an element of this prime field, failing if the input is not canonical (is not smaller than the field’s modulus).

The byte representation is interpreted with the same endianness as elements returned by PrimeField::to_repr.

Security

This method provides no constant-time guarantees. Implementors of the PrimeField trait may optimise this method using non-constant-time logic.

Returns true iff this element is even.

Implementors§