mirror of
https://source.quilibrium.com/quilibrium/ceremonyclient.git
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210 lines
7.3 KiB
Go
210 lines
7.3 KiB
Go
package bulletproof
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import (
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"github.com/gtank/merlin"
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"github.com/pkg/errors"
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"source.quilibrium.com/quilibrium/monorepo/nekryptology/pkg/core/curves"
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)
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// InnerProductVerifier is the struct used to verify inner product proofs
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// It specifies which curve to use and holds precomputed generators
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// See NewInnerProductProver() for prover initialization.
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type InnerProductVerifier struct {
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curve curves.Curve
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generators ippGenerators
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}
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// NewInnerProductVerifier initializes a new verifier
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// It uses the specified domain to generate generators for vectors of at most maxVectorLength
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// A verifier can be used to verify inner product proofs for vectors of length less than or equal to maxVectorLength
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// A verifier is defined by an explicit curve.
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func NewInnerProductVerifier(maxVectorLength int, domain []byte, curve curves.Curve) (*InnerProductVerifier, error) {
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generators, err := getGeneratorPoints(maxVectorLength, domain, curve)
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if err != nil {
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return nil, errors.Wrap(err, "ipp getGenerators")
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}
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return &InnerProductVerifier{curve: curve, generators: *generators}, nil
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}
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// Verify verifies the given proof inputs
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// It implements the final comparison of section 3.1 on pg17 of https://eprint.iacr.org/2017/1066.pdf
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func (verifier *InnerProductVerifier) Verify(capP, u curves.Point, proof *InnerProductProof, transcript *merlin.Transcript) (bool, error) {
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if len(proof.capLs) != len(proof.capRs) {
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return false, errors.New("ipp capLs and capRs must be same length")
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}
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// Generator vectors must be same length
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if len(verifier.generators.G) != len(verifier.generators.H) {
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return false, errors.New("ipp generator lengths of g and h must be equal")
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}
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// Get generators for each elem in a, b and one more for u
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// len(Ls) = log n, therefore can just exponentiate
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n := 1 << len(proof.capLs)
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// Length of vectors must be less than the number of generators generated
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if n > len(verifier.generators.G) {
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return false, errors.New("ipp vector length must be less than maxVectorLength")
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}
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// In case where len(a) is less than number of generators precomputed by prover, trim to length
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proofG := verifier.generators.G[0:n]
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proofH := verifier.generators.H[0:n]
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xs, err := getxs(transcript, proof.capLs, proof.capRs, verifier.curve)
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if err != nil {
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return false, errors.Wrap(err, "verifier getxs")
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}
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s, err := verifier.getsNew(xs, n)
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if err != nil {
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return false, errors.Wrap(err, "verifier getss")
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}
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lhs, err := verifier.getLHS(u, proof, proofG, proofH, s)
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if err != nil {
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return false, errors.Wrap(err, "verify getLHS")
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}
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rhs, err := verifier.getRHS(capP, proof, xs)
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if err != nil {
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return false, errors.Wrap(err, "verify getRHS")
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}
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return lhs.Equal(rhs), nil
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}
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// Verify verifies the given proof inputs
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// It implements the final comparison of section 3.1 on pg17 of https://eprint.iacr.org/2017/1066.pdf
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func (verifier *InnerProductVerifier) VerifyFromRangeProof(proofG, proofH []curves.Point, capPhmuinv, u curves.Point, tHat curves.Scalar, proof *InnerProductProof, transcript *merlin.Transcript) (bool, error) {
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// Get generators for each elem in a, b and one more for u
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// len(Ls) = log n, therefore can just exponentiate
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n := 1 << len(proof.capLs)
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xs, err := getxs(transcript, proof.capLs, proof.capRs, verifier.curve)
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if err != nil {
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return false, errors.Wrap(err, "verifier getxs")
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}
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s, err := verifier.gets(xs, n)
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if err != nil {
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return false, errors.Wrap(err, "verifier getss")
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}
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lhs, err := verifier.getLHS(u, proof, proofG, proofH, s)
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if err != nil {
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return false, errors.Wrap(err, "verify getLHS")
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}
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utHat := u.Mul(tHat)
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capP := capPhmuinv.Add(utHat)
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rhs, err := verifier.getRHS(capP, proof, xs)
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if err != nil {
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return false, errors.Wrap(err, "verify getRHS")
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}
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return lhs.Equal(rhs), nil
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}
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// getRHS gets the right hand side of the final comparison of section 3.1 on pg17.
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func (*InnerProductVerifier) getRHS(capP curves.Point, proof *InnerProductProof, xs []curves.Scalar) (curves.Point, error) {
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product := capP
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for j, Lj := range proof.capLs {
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Rj := proof.capRs[j]
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xj := xs[j]
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xjSquare := xj.Square()
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xjSquareInv, err := xjSquare.Invert()
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if err != nil {
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return nil, errors.Wrap(err, "verify invert")
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}
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LjxjSquare := Lj.Mul(xjSquare)
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RjxjSquareInv := Rj.Mul(xjSquareInv)
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product = product.Add(LjxjSquare).Add(RjxjSquareInv)
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}
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return product, nil
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}
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// getLHS gets the left hand side of the final comparison of section 3.1 on pg17.
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func (verifier *InnerProductVerifier) getLHS(u curves.Point, proof *InnerProductProof, g, h []curves.Point, s []curves.Scalar) (curves.Point, error) {
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sInv, err := invertScalars(s)
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if err != nil {
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return nil, errors.Wrap(err, "verify invertScalars")
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}
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// g^(a*s)
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as := multiplyScalarToScalarVector(proof.a, s)
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gas := verifier.curve.Point.SumOfProducts(g, as)
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// h^(b*s^-1)
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bsInv := multiplyScalarToScalarVector(proof.b, sInv)
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hbsInv := verifier.curve.Point.SumOfProducts(h, bsInv)
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// u^a*b
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ab := proof.a.Mul(proof.b)
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uab := u.Mul(ab)
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// g^(a*s) * h^(b*s^-1) * u^a*b
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out := gas.Add(hbsInv).Add(uab)
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return out, nil
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}
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// getxs calculates the x values from Ls and Rs
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// Note that each x is read from the transcript, then the L and R at a certain index are written to the transcript
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// This mirrors the reading of xs and writing of Ls and Rs in the prover.
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func getxs(transcript *merlin.Transcript, capLs, capRs []curves.Point, curve curves.Curve) ([]curves.Scalar, error) {
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xs := make([]curves.Scalar, len(capLs))
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for i, capLi := range capLs {
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capRi := capRs[i]
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// Add the newest L and R values to transcript
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transcript.AppendMessage([]byte("addRecursiveL"), capLi.ToAffineUncompressed())
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transcript.AppendMessage([]byte("addRecursiveR"), capRi.ToAffineUncompressed())
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// Read 64 bytes from, set to scalar
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outBytes := transcript.ExtractBytes([]byte("getx"), 64)
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x, err := curve.NewScalar().SetBytesWide(outBytes)
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if err != nil {
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return nil, errors.Wrap(err, "calcx NewScalar SetBytesWide")
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}
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xs[i] = x
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}
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return xs, nil
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}
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// gets calculates the vector s of values used for verification
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// See the second expression of section 3.1 on pg15
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//nolint
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func (verifier *InnerProductVerifier) gets(xs []curves.Scalar, n int) ([]curves.Scalar, error) {
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ss := make([]curves.Scalar, n)
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for i := 0; i < n; i++ {
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si := verifier.curve.Scalar.One()
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for j, xj := range xs {
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if i>>(len(xs)-j-1)&0x01 == 1 {
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si = si.Mul(xj)
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} else {
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xjInverse, err := xj.Invert()
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if err != nil {
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return nil, errors.Wrap(err, "getss invert")
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}
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si = si.Mul(xjInverse)
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}
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}
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ss[i] = si
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}
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return ss, nil
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}
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// getsNew calculates the vector s of values used for verification
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// It provides analogous functionality as gets(), but uses a O(n) algorithm vs O(nlogn)
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// The algorithm inverts all xs, then begins multiplying the inversion by the square of x elements to
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// calculate all s values thus minimizing necessary inversions/ computation.
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func (verifier *InnerProductVerifier) getsNew(xs []curves.Scalar, n int) ([]curves.Scalar, error) {
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var err error
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ss := make([]curves.Scalar, n)
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// First element is all xs inverted mul'd
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ss[0] = verifier.curve.Scalar.One()
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for _, xj := range xs {
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ss[0] = ss[0].Mul(xj)
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}
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ss[0], err = ss[0].Invert()
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if err != nil {
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return nil, errors.Wrap(err, "ipp gets inv ss0")
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}
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for j, xj := range xs {
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xjSquared := xj.Square()
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for i := 0; i < n; i += 1 << (len(xs) - j) {
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ss[i+1<<(len(xs)-j-1)] = ss[i].Mul(xjSquared)
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}
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}
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return ss, nil
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}
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