Documentation ¶
Index ¶
Constants ¶
This section is empty.
Variables ¶
This section is empty.
Functions ¶
func Setup ¶
func Setup(spr *cs.SparseR1CS, srs *kzg.SRS) (*ProvingKey, *VerifyingKey, error)
Setup sets proving and verifying keys
func Verify ¶
func Verify(proof *Proof, vk *VerifyingKey, publicWitness bls24_315witness.Witness) error
Types ¶
type Proof ¶
type Proof struct { // Commitments to the solution vectors LRO [3]kzg.Digest // Commitment to Z, the permutation polynomial Z kzg.Digest // Commitments to h1, h2, h3 such that h = h1 + Xh2 + X**2h3 is the quotient polynomial H [3]kzg.Digest // Batch opening proof of h1 + zeta*h2 + zeta**2h3, linearizedPolynomial, l, r, o, s1, s2 BatchedProof kzg.BatchOpeningProof // Opening proof of Z at zeta*mu ZShiftedOpening kzg.OpeningProof }
func Prove ¶
func Prove(spr *cs.SparseR1CS, pk *ProvingKey, fullWitness bls24_315witness.Witness, opt backend.ProverConfig) (*Proof, error)
Prove from the public data
type ProvingKey ¶
type ProvingKey struct { // Verifying Key is embedded into the proving key (needed by Prove) Vk *VerifyingKey // qr,ql,qm,qo (in canonical basis). Ql, Qr, Qm, Qo []fr.Element // LQk (CQk) qk in Lagrange basis (canonical basis), prepended with as many zeroes as public inputs. // Storing LQk in Lagrange basis saves a fft... CQk, LQk []fr.Element // Domains used for the FFTs. // Domain[0] = small Domain // Domain[1] = big Domain Domain [2]fft.Domain // Permutation polynomials EvaluationPermutationBigDomainBitReversed []fr.Element S1Canonical, S2Canonical, S3Canonical []fr.Element // position -> permuted position (position in [0,3*sizeSystem-1]) Permutation []int64 }
ProvingKey stores the data needed to generate a proof: * the commitment scheme * ql, prepended with as many ones as they are public inputs * qr, qm, qo prepended with as many zeroes as there are public inputs. * qk, prepended with as many zeroes as public inputs, to be completed by the prover with the list of public inputs. * sigma_1, sigma_2, sigma_3 in both basis * the copy constraint permutation
func (*ProvingKey) InitKZG ¶
func (pk *ProvingKey) InitKZG(srs kzgg.SRS) error
InitKZG inits pk.Vk.KZG using pk.Domain[0] cardinality and provided SRS
This should be used after deserializing a ProvingKey as pk.Vk.KZG is NOT serialized
func (*ProvingKey) ReadFrom ¶
func (pk *ProvingKey) ReadFrom(r io.Reader) (int64, error)
ReadFrom reads from binary representation in r into ProvingKey
func (*ProvingKey) VerifyingKey ¶
func (pk *ProvingKey) VerifyingKey() interface{}
VerifyingKey returns pk.Vk
type VerifyingKey ¶
type VerifyingKey struct { // Size circuit Size uint64 SizeInv fr.Element Generator fr.Element NbPublicVariables uint64 // Commitment scheme that is used for an instantiation of PLONK KZGSRS *kzg.SRS // cosetShift generator of the coset on the small domain CosetShift fr.Element // S commitments to S1, S2, S3 S [3]kzg.Digest // Commitments to ql, qr, qm, qo prepended with as many zeroes (ones for l) as there are public inputs. // In particular Qk is not complete. Ql, Qr, Qm, Qo, Qk kzg.Digest }
VerifyingKey stores the data needed to verify a proof: * The commitment scheme * Commitments of ql prepended with as many ones as there are public inputs * Commitments of qr, qm, qo, qk prepended with as many zeroes as there are public inputs * Commitments to S1, S2, S3
func (*VerifyingKey) InitKZG ¶
func (vk *VerifyingKey) InitKZG(srs kzgg.SRS) error
InitKZG inits vk.KZG using provided SRS
This should be used after deserializing a VerifyingKey as vk.KZG is NOT serialized
Note that this instantiate a new FFT domain using vk.Size
func (*VerifyingKey) NbPublicWitness ¶
func (vk *VerifyingKey) NbPublicWitness() int
NbPublicWitness returns the expected public witness size (number of field elements)