Documentation
¶
Overview ¶
Package iop provides an API to computations common to iop backends (permutation, quotient).
Index ¶
- Variables
- type Basis
- type Expression
- type Form
- type Layout
- type Polynomial
- func BuildRatioCopyConstraint(entries []*Polynomial, permutation []int64, beta, gamma fr.Element, ...) (*Polynomial, error)
- func BuildRatioShuffledVectors(numerator, denominator []*Polynomial, beta fr.Element, expectedForm Form, ...) (*Polynomial, error)
- func DivideByXMinusOne(a *Polynomial, domains [2]*fft.Domain) (*Polynomial, error)
- func Evaluate(f Expression, form Form, x ...*Polynomial) (*Polynomial, error)
- func NewPolynomial(coeffs *[]fr.Element, form Form) *Polynomial
- func (p *Polynomial) Blind(blindingOrder int) *Polynomial
- func (p *Polynomial) BlindedSize() int
- func (p *Polynomial) Clone(capacity ...int) *Polynomial
- func (p Polynomial) Coefficients() []fr.Element
- func (p *Polynomial) Evaluate(x fr.Element) fr.Element
- func (p *Polynomial) GetCoeff(i int) fr.Element
- func (p *Polynomial) ReadFrom(r io.Reader) (int64, error)
- func (p *Polynomial) SetBlindedSize(size int)
- func (p *Polynomial) SetSize(size int)
- func (p *Polynomial) ShallowClone() *Polynomial
- func (p *Polynomial) Shift(shift int) *Polynomial
- func (p *Polynomial) Size() int
- func (p *Polynomial) ToBitReverse() *Polynomial
- func (p *Polynomial) ToCanonical(d *fft.Domain) *Polynomial
- func (p *Polynomial) ToLagrange(d *fft.Domain) *Polynomial
- func (p *Polynomial) ToLagrangeCoset(d *fft.Domain) *Polynomial
- func (p *Polynomial) ToRegular() *Polynomial
- func (p *Polynomial) WriteTo(w io.Writer) (int64, error)
Constants ¶
This section is empty.
Variables ¶
var ( ErrMustBeRegular = errors.New("the layout must be Regular") ErrMustBeCanonical = errors.New("the basis must be Canonical") ErrMustBeLagrangeCoset = errors.New("the basis must be LagrangeCoset") ErrInconsistentFormat = errors.New("the format of the polynomials must be the same") ErrInconsistentSize = errors.New("the sizes of the polynomial must be the same as the size of the domain") ErrNumberPolynomials = errors.New("the number of polynomials in the denominator and the numerator must be the same") ErrSizeNotPowerOfTwo = errors.New("the size of the polynomials must be a power of two") ErrInconsistentSizeDomain = errors.New("the size of the domain must be consistent with the size of the polynomials") ErrIncorrectNumberOfVariables = errors.New("the number of variables is incorrect") )
errors related to the computation of the quotient and the ratios.
Functions ¶
This section is empty.
Types ¶
type Expression ¶
Expression represents a multivariate polynomial.
type Layout ¶
type Layout uint32
Layout indicates if a polynomial has a BitReverse or a Regular layout
type Polynomial ¶
type Polynomial struct {
// contains filtered or unexported fields
}
Polynomial wraps a polynomial so that it is interpreted as P'(X)=P(\omega^{s}X). Size is the real size of the polynomial (seen as a vector). For instance if len(P)=32 but P.Size=8, it means that P has been extended (e.g. it is evaluated on a larger set) but P is a polynomial of degree 7. blindedSize is the size of the polynomial when it is blinded. By default blindedSize=Size, until the polynomial is blinded.
func BuildRatioCopyConstraint ¶
func BuildRatioCopyConstraint( entries []*Polynomial, permutation []int64, beta, gamma fr.Element, expectedForm Form, domain *fft.Domain) (*Polynomial, error)
BuildRatioCopyConstraint builds the accumulating ratio polynomial to prove that [P₁ ∥ .. ∥ P_{n—1}] is invariant by the permutation \sigma. Namely it returns the polynomial Z whose evaluation on the j-th root of unity is Z(ω^j) = Π_{i<j}(Π_{k<n}(P_k(ω^i)+β*u^k+γ))/(P_k(ω^i)+σ(kn+i)+γ))) * entries list of polynomials whose evaluation are invariant under \sigma * beta, gamma challenges * expectedForm expected form of the resulting polynomial
func BuildRatioShuffledVectors ¶
func BuildRatioShuffledVectors(numerator, denominator []*Polynomial, beta fr.Element, expectedForm Form, domain *fft.Domain) (*Polynomial, error)
Build an 'accumulating ratio' polynomial. * numerator list of polynomials that will form the numerator of the ratio * denominator list of polynomials that will form the denominator of the ratio The polynomials in the denominator and the numerator are expected to be of the same size and the size must be a power of 2. The polynomials are given as pointers in case the caller wants to FFTInv the polynomials during the process. * beta variable at which the numerator and denominators are evaluated * expectedForm expected form of the resulting polynomial * Return: say beta=β, numerator = [P₁,...,P_m], denominator = [Q₁,..,Q_m]. The function returns a polynomial whose evaluation on the j-th root of unity is (Π_{k<j}Π_{i<m}(β-Pᵢ(ωᵏ)))/(β-Qᵢ(ωᵏ))
func DivideByXMinusOne ¶
func DivideByXMinusOne(a *Polynomial, domains [2]*fft.Domain) (*Polynomial, error)
DivideByXMinusOne The input must be in LagrangeCoset. The result is in Canonical Regular.
func Evaluate ¶
func Evaluate(f Expression, form Form, x ...*Polynomial) (*Polynomial, error)
Evaluate evaluates f on each entry of x. The returned value is the vector of evaluations of e on x. The form of the result is form. The Size field of the result is the same as the one of x[0]. The blindedSize field of the result is the same as Size. The Shift field of the result is 0.
func NewPolynomial ¶
func NewPolynomial(coeffs *[]fr.Element, form Form) *Polynomial
NewPolynomial returned a Polynomial from the provided coefficients in the given form. A Polynomial can be seen as a "shared pointer" on a list of coefficients. It is the responsibility of the user to call the Clone method if the coefficients shouldn't be mutated.
func (*Polynomial) Blind ¶
func (p *Polynomial) Blind(blindingOrder int) *Polynomial
Blind blinds a polynomial q by adding Q(X)*(X^{n}-1), where deg Q = blindingOrder and Q is random, and n is the size of q. Sets the result to p and returns it.
blindingOrder is the degree of Q, where the blinding is Q(X)*(X^{n}-1) where n is the size of p. The size of p is modified since the underlying polynomial is of bigger degree now. The new size is p.Size+1+blindingOrder.
/!\ The code panics if wq is not in canonical, regular layout
func (*Polynomial) BlindedSize ¶
func (p *Polynomial) BlindedSize() int
BlindedSize returns the the size of the polynomial when it is blinded. By default blindedSize=Size, until the polynomial is blinded.
func (*Polynomial) Clone ¶
func (p *Polynomial) Clone(capacity ...int) *Polynomial
Clone returns a deep copy of p. The underlying polynomial is cloned; see also ShallowClone to perform a ShallowClone on the underlying polynomial. If capacity is provided, the new coefficient slice capacity will be set accordingly.
func (Polynomial) Coefficients ¶
Coefficients returns a slice on the underlying data structure.
func (*Polynomial) Evaluate ¶
func (p *Polynomial) Evaluate(x fr.Element) fr.Element
Evaluate evaluates p at x. The code panics if the function is not in canonical form.
func (*Polynomial) GetCoeff ¶
func (p *Polynomial) GetCoeff(i int) fr.Element
GetCoeff returns the i-th entry of p, taking the layout in account.
func (*Polynomial) ReadFrom ¶
func (p *Polynomial) ReadFrom(r io.Reader) (int64, error)
ReadFrom implements io.ReaderFrom
func (*Polynomial) SetBlindedSize ¶ added in v0.11.2
func (p *Polynomial) SetBlindedSize(size int)
SetBlindedSize sets the blinded size of the polynomial.
func (*Polynomial) SetSize ¶ added in v0.11.2
func (p *Polynomial) SetSize(size int)
SetSize sets the size of the polynomial. size is the real size of the polynomial (seen as a vector). For instance if len(P)=32 but P.size=8, it means that P has been extended (e.g. it is evaluated on a larger set) but P is a polynomial of degree 7.
func (*Polynomial) ShallowClone ¶
func (p *Polynomial) ShallowClone() *Polynomial
ShallowClone returns a shallow copy of p. The underlying polynomial coefficient is NOT cloned and both objects will point to the same coefficient vector.
func (*Polynomial) Shift ¶
func (p *Polynomial) Shift(shift int) *Polynomial
Shift the wrapped polynomial; it doesn't modify the underlying data structure, but flag the Polynomial such that it will be interpreted as p(\omega^shift X)
func (*Polynomial) Size ¶ added in v0.11.2
func (p *Polynomial) Size() int
Size returns the real size of the polynomial (seen as a vector). For instance if len(P)=32 but P.Size=8, it means that P has been extended (e.g. it is evaluated on a larger set) but P is a polynomial of degree 7.
func (*Polynomial) ToBitReverse ¶
func (p *Polynomial) ToBitReverse() *Polynomial
ToBitReverse changes the layout of p to BitReverse. Leaves p unchanged if p's layout was already BitReverse.
func (*Polynomial) ToCanonical ¶
func (p *Polynomial) ToCanonical(d *fft.Domain) *Polynomial
ToCanonical converts p to canonical form. Leaves p unchanged if p was already in Canonical form.
func (*Polynomial) ToLagrange ¶
func (p *Polynomial) ToLagrange(d *fft.Domain) *Polynomial
ToLagrange converts p to Lagrange form. Leaves p unchanged if p was already in Lagrange form.
func (*Polynomial) ToLagrangeCoset ¶
func (p *Polynomial) ToLagrangeCoset(d *fft.Domain) *Polynomial
ToLagrangeCoset Sets p to q, in LagrangeCoset form and returns it.
func (*Polynomial) ToRegular ¶
func (p *Polynomial) ToRegular() *Polynomial
ToRegular changes the layout of p to Regular. Leaves p unchanged if p's layout was already Regular.
Source Files