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https://git.uploadfilter24.eu/lerentis/terraform-provider-gitea.git
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181 lines
4.2 KiB
Go
181 lines
4.2 KiB
Go
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package ed25519
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import (
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"crypto/subtle"
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"encoding/binary"
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"math/bits"
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"github.com/cloudflare/circl/internal/conv"
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"github.com/cloudflare/circl/math"
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fp "github.com/cloudflare/circl/math/fp25519"
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)
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var paramD = fp.Elt{
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0xa3, 0x78, 0x59, 0x13, 0xca, 0x4d, 0xeb, 0x75,
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0xab, 0xd8, 0x41, 0x41, 0x4d, 0x0a, 0x70, 0x00,
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0x98, 0xe8, 0x79, 0x77, 0x79, 0x40, 0xc7, 0x8c,
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0x73, 0xfe, 0x6f, 0x2b, 0xee, 0x6c, 0x03, 0x52,
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}
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// mLSBRecoding parameters.
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const (
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fxT = 257
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fxV = 2
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fxW = 3
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fx2w1 = 1 << (uint(fxW) - 1)
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numWords64 = (paramB * 8 / 64)
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)
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// mLSBRecoding is the odd-only modified LSB-set.
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//
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// Reference:
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//
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// "Efficient and secure algorithms for GLV-based scalar multiplication and
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// their implementation on GLV–GLS curves" by (Faz-Hernandez et al.)
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// http://doi.org/10.1007/s13389-014-0085-7.
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func mLSBRecoding(L []int8, k []byte) {
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const ee = (fxT + fxW*fxV - 1) / (fxW * fxV)
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const dd = ee * fxV
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const ll = dd * fxW
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if len(L) == (ll + 1) {
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var m [numWords64 + 1]uint64
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for i := 0; i < numWords64; i++ {
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m[i] = binary.LittleEndian.Uint64(k[8*i : 8*i+8])
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}
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condAddOrderN(&m)
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L[dd-1] = 1
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for i := 0; i < dd-1; i++ {
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kip1 := (m[(i+1)/64] >> (uint(i+1) % 64)) & 0x1
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L[i] = int8(kip1<<1) - 1
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}
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{ // right-shift by d
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right := uint(dd % 64)
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left := uint(64) - right
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lim := ((numWords64+1)*64 - dd) / 64
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j := dd / 64
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for i := 0; i < lim; i++ {
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m[i] = (m[i+j] >> right) | (m[i+j+1] << left)
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}
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m[lim] = m[lim+j] >> right
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}
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for i := dd; i < ll; i++ {
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L[i] = L[i%dd] * int8(m[0]&0x1)
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div2subY(m[:], int64(L[i]>>1), numWords64)
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}
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L[ll] = int8(m[0])
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}
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}
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// absolute returns always a positive value.
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func absolute(x int32) int32 {
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mask := x >> 31
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return (x + mask) ^ mask
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}
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// condAddOrderN updates x = x+order if x is even, otherwise x remains unchanged.
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func condAddOrderN(x *[numWords64 + 1]uint64) {
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isOdd := (x[0] & 0x1) - 1
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c := uint64(0)
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for i := 0; i < numWords64; i++ {
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orderWord := binary.LittleEndian.Uint64(order[8*i : 8*i+8])
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o := isOdd & orderWord
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x0, c0 := bits.Add64(x[i], o, c)
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x[i] = x0
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c = c0
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}
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x[numWords64], _ = bits.Add64(x[numWords64], 0, c)
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}
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// div2subY update x = (x/2) - y.
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func div2subY(x []uint64, y int64, l int) {
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s := uint64(y >> 63)
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for i := 0; i < l-1; i++ {
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x[i] = (x[i] >> 1) | (x[i+1] << 63)
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}
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x[l-1] = (x[l-1] >> 1)
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b := uint64(0)
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x0, b0 := bits.Sub64(x[0], uint64(y), b)
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x[0] = x0
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b = b0
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for i := 1; i < l-1; i++ {
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x0, b0 := bits.Sub64(x[i], s, b)
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x[i] = x0
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b = b0
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}
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x[l-1], _ = bits.Sub64(x[l-1], s, b)
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}
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func (P *pointR1) fixedMult(scalar []byte) {
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if len(scalar) != paramB {
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panic("wrong scalar size")
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}
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const ee = (fxT + fxW*fxV - 1) / (fxW * fxV)
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const dd = ee * fxV
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const ll = dd * fxW
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L := make([]int8, ll+1)
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mLSBRecoding(L[:], scalar)
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S := &pointR3{}
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P.SetIdentity()
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for ii := ee - 1; ii >= 0; ii-- {
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P.double()
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for j := 0; j < fxV; j++ {
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dig := L[fxW*dd-j*ee+ii-ee]
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for i := (fxW-1)*dd - j*ee + ii - ee; i >= (2*dd - j*ee + ii - ee); i = i - dd {
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dig = 2*dig + L[i]
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}
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idx := absolute(int32(dig))
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sig := L[dd-j*ee+ii-ee]
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Tabj := &tabSign[fxV-j-1]
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for k := 0; k < fx2w1; k++ {
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S.cmov(&Tabj[k], subtle.ConstantTimeEq(int32(k), idx))
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}
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S.cneg(subtle.ConstantTimeEq(int32(sig), -1))
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P.mixAdd(S)
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}
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}
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}
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const (
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omegaFix = 7
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omegaVar = 5
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)
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// doubleMult returns P=mG+nQ.
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func (P *pointR1) doubleMult(Q *pointR1, m, n []byte) {
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nafFix := math.OmegaNAF(conv.BytesLe2BigInt(m), omegaFix)
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nafVar := math.OmegaNAF(conv.BytesLe2BigInt(n), omegaVar)
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if len(nafFix) > len(nafVar) {
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nafVar = append(nafVar, make([]int32, len(nafFix)-len(nafVar))...)
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} else if len(nafFix) < len(nafVar) {
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nafFix = append(nafFix, make([]int32, len(nafVar)-len(nafFix))...)
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}
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var TabQ [1 << (omegaVar - 2)]pointR2
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Q.oddMultiples(TabQ[:])
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P.SetIdentity()
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for i := len(nafFix) - 1; i >= 0; i-- {
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P.double()
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// Generator point
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if nafFix[i] != 0 {
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idxM := absolute(nafFix[i]) >> 1
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R := tabVerif[idxM]
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if nafFix[i] < 0 {
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R.neg()
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}
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P.mixAdd(&R)
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}
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// Variable input point
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if nafVar[i] != 0 {
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idxN := absolute(nafVar[i]) >> 1
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S := TabQ[idxN]
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if nafVar[i] < 0 {
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S.neg()
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}
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P.add(&S)
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}
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}
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}
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