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233 lines
5.1 KiB
Go
233 lines
5.1 KiB
Go
// Code generated by addchain. DO NOT EDIT.
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package bn256
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// Sqrt sets e to a square root of x. If x is not a square, Sqrt returns
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// false and e is unchanged. e and x can overlap.
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func Sqrt(e, x *gfP) (isSquare bool) {
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candidate, b, i := &gfP{}, &gfP{}, &gfP{}
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sqrtCandidate(candidate, x)
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gfpMul(b, twoExpPMinus5Over8, candidate) // b=ta1
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gfpMul(candidate, x, b) // a1=fb
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gfpMul(i, two, candidate) // i=2(fb)
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gfpMul(i, i, b) // i=2(fb)b
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gfpSub(i, i, one) // i=2(fb)b-1
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gfpMul(i, candidate, i) // i=(fb)(2(fb)b-1)
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square := new(gfP).Square(i)
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if square.Equal(x) != 1 {
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return false
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}
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e.Set(i)
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return true
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}
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// sqrtCandidate sets z to a square root candidate for x. z and x must not overlap.
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func sqrtCandidate(z, x *gfP) {
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// Since p = 8k+5, exponentiation by (p - 5) / 8 yields a square root candidate.
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//
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// The sequence of 54 multiplications and 248 squarings is derived from the
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// following addition chain generated with github.com/mmcloughlin/addchain v0.4.0.
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//
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// _10 = 2*1
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// _100 = 2*_10
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// _110 = _10 + _100
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// _1010 = _100 + _110
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// _1011 = 1 + _1010
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// _1101 = _10 + _1011
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// _1111 = _10 + _1101
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// _10000 = 1 + _1111
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// _10101 = _110 + _1111
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// _11011 = _110 + _10101
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// _11101 = _10 + _11011
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// _11111 = _10 + _11101
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// _101001 = _1010 + _11111
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// _101011 = _10 + _101001
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// _111011 = _10000 + _101011
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// _1000101 = _1010 + _111011
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// _1001111 = _1010 + _1000101
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// _1010001 = _10 + _1001111
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// _1011011 = _1010 + _1010001
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// _1011101 = _10 + _1011011
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// _1011111 = _10 + _1011101
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// _1100011 = _100 + _1011111
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// _1101001 = _110 + _1100011
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// _1101101 = _100 + _1101001
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// _1101111 = _10 + _1101101
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// _1110101 = _110 + _1101111
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// i72 = ((_1011011 << 3 + 1) << 33 + _10101) << 8
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// i94 = ((_11101 + i72) << 9 + _1101111) << 10 + _1110101
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// i116 = ((2*i94 + 1) << 14 + _1110101) << 5
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// i129 = 2*((_1101 + i116) << 9 + _1110101) + _10101
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// i153 = ((i129 << 5 + _1011) << 9 + _111011) << 8
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// i174 = ((_11101 + i153) << 9 + _101001) << 9 + _11111
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// i201 = ((i174 << 8 + _101001) << 9 + _1101001) << 8
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// i220 = ((_1100011 + i201) << 8 + _1001111) << 8 + _1011101
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// i244 = ((i220 << 7 + _1101101) << 7 + _1011111) << 8
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// i260 = ((_101011 + i244) << 6 + _11111) << 7 + _11011
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// i286 = ((i260 << 9 + _1001111) << 7 + _1100011) << 8
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// return ((_1010001 + i286) << 8 + _1000101) << 5 + _1111
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//
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var t0 = new(gfP)
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var t1 = new(gfP)
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var t2 = new(gfP)
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var t3 = new(gfP)
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var t4 = new(gfP)
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var t5 = new(gfP)
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var t6 = new(gfP)
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var t7 = new(gfP)
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var t8 = new(gfP)
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var t9 = new(gfP)
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var t10 = new(gfP)
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var t11 = new(gfP)
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var t12 = new(gfP)
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var t13 = new(gfP)
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var t14 = new(gfP)
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var t15 = new(gfP)
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var t16 = new(gfP)
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var t17 = new(gfP)
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var t18 = new(gfP)
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var t19 = new(gfP)
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t18.Square(x)
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t8.Square(t18)
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t16.Mul(t18, t8)
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t2.Mul(t8, t16)
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t14.Mul(x, t2)
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t17.Mul(t18, t14)
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z.Mul(t18, t17)
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t0.Mul(x, z)
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t15.Mul(t16, z)
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t4.Mul(t16, t15)
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t12.Mul(t18, t4)
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t5.Mul(t18, t12)
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t11.Mul(t2, t5)
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t6.Mul(t18, t11)
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t13.Mul(t0, t6)
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t0.Mul(t2, t13)
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t3.Mul(t2, t0)
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t1.Mul(t18, t3)
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t19.Mul(t2, t1)
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t9.Mul(t18, t19)
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t7.Mul(t18, t9)
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t2.Mul(t8, t7)
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t10.Mul(t16, t2)
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t8.Mul(t8, t10)
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t18.Mul(t18, t8)
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t16.Mul(t16, t18)
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for s := 0; s < 3; s++ {
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t19.Square(t19)
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}
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t19.Mul(x, t19)
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for s := 0; s < 33; s++ {
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t19.Square(t19)
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}
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t19.Mul(t15, t19)
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for s := 0; s < 8; s++ {
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t19.Square(t19)
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}
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t19.Mul(t12, t19)
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for s := 0; s < 9; s++ {
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t19.Square(t19)
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}
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t18.Mul(t18, t19)
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for s := 0; s < 10; s++ {
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t18.Square(t18)
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}
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t18.Mul(t16, t18)
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t18.Square(t18)
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t18.Mul(x, t18)
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for s := 0; s < 14; s++ {
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t18.Square(t18)
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}
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t18.Mul(t16, t18)
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for s := 0; s < 5; s++ {
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t18.Square(t18)
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}
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t17.Mul(t17, t18)
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for s := 0; s < 9; s++ {
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t17.Square(t17)
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}
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t16.Mul(t16, t17)
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t16.Square(t16)
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t15.Mul(t15, t16)
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for s := 0; s < 5; s++ {
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t15.Square(t15)
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}
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t14.Mul(t14, t15)
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for s := 0; s < 9; s++ {
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t14.Square(t14)
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}
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t13.Mul(t13, t14)
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for s := 0; s < 8; s++ {
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t13.Square(t13)
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}
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t12.Mul(t12, t13)
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for s := 0; s < 9; s++ {
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t12.Square(t12)
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}
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t12.Mul(t11, t12)
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for s := 0; s < 9; s++ {
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t12.Square(t12)
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}
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t12.Mul(t5, t12)
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for s := 0; s < 8; s++ {
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t12.Square(t12)
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}
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t11.Mul(t11, t12)
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for s := 0; s < 9; s++ {
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t11.Square(t11)
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}
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t10.Mul(t10, t11)
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for s := 0; s < 8; s++ {
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t10.Square(t10)
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}
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t10.Mul(t2, t10)
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for s := 0; s < 8; s++ {
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t10.Square(t10)
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}
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t10.Mul(t3, t10)
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for s := 0; s < 8; s++ {
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t10.Square(t10)
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}
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t9.Mul(t9, t10)
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for s := 0; s < 7; s++ {
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t9.Square(t9)
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}
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t8.Mul(t8, t9)
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for s := 0; s < 7; s++ {
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t8.Square(t8)
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}
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t7.Mul(t7, t8)
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for s := 0; s < 8; s++ {
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t7.Square(t7)
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}
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t6.Mul(t6, t7)
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for s := 0; s < 6; s++ {
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t6.Square(t6)
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}
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t5.Mul(t5, t6)
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for s := 0; s < 7; s++ {
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t5.Square(t5)
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}
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t4.Mul(t4, t5)
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for s := 0; s < 9; s++ {
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t4.Square(t4)
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}
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t3.Mul(t3, t4)
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for s := 0; s < 7; s++ {
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t3.Square(t3)
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}
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t2.Mul(t2, t3)
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for s := 0; s < 8; s++ {
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t2.Square(t2)
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}
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t1.Mul(t1, t2)
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for s := 0; s < 8; s++ {
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t1.Square(t1)
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}
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t0.Mul(t0, t1)
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for s := 0; s < 5; s++ {
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t0.Square(t0)
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}
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z.Mul(z, t0)
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}
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