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package fields
import ( "bytes" "math/big" )
// Fq6 is Field 6
type Fq6 struct { F Fq2 NonResidue [2]*big.Int }
// NewFq6 generates a new Fq6
func NewFq6(f Fq2, nonResidue [2]*big.Int) Fq6 { fq6 := Fq6{ f, nonResidue, } return fq6 }
// Zero returns a Zero value on the Fq6
func (fq6 Fq6) Zero() [3][2]*big.Int { return [3][2]*big.Int{fq6.F.Zero(), fq6.F.Zero(), fq6.F.Zero()} }
// One returns a One value on the Fq6
func (fq6 Fq6) One() [3][2]*big.Int { return [3][2]*big.Int{fq6.F.One(), fq6.F.Zero(), fq6.F.Zero()} }
func (fq6 Fq6) mulByNonResidue(a [2]*big.Int) [2]*big.Int { return fq6.F.Mul(fq6.NonResidue, a) }
// Add performs an addition on the Fq6
func (fq6 Fq6) Add(a, b [3][2]*big.Int) [3][2]*big.Int { return [3][2]*big.Int{ fq6.F.Add(a[0], b[0]), fq6.F.Add(a[1], b[1]), fq6.F.Add(a[2], b[2]), } }
// Double is ...
func (fq6 Fq6) Double(a [3][2]*big.Int) [3][2]*big.Int { return fq6.Add(a, a) }
// Sub performs a subtraction on the Fq6
func (fq6 Fq6) Sub(a, b [3][2]*big.Int) [3][2]*big.Int { return [3][2]*big.Int{ fq6.F.Sub(a[0], b[0]), fq6.F.Sub(a[1], b[1]), fq6.F.Sub(a[2], b[2]), } }
// Neg performs a negation on the Fq6
func (fq6 Fq6) Neg(a [3][2]*big.Int) [3][2]*big.Int { return fq6.Sub(fq6.Zero(), a) }
// Mul performs a multiplication on the Fq6
func (fq6 Fq6) Mul(a, b [3][2]*big.Int) [3][2]*big.Int { v0 := fq6.F.Mul(a[0], b[0]) v1 := fq6.F.Mul(a[1], b[1]) v2 := fq6.F.Mul(a[2], b[2]) return [3][2]*big.Int{ fq6.F.Add( v0, fq6.mulByNonResidue( fq6.F.Sub( fq6.F.Mul( fq6.F.Add(a[1], a[2]), fq6.F.Add(b[1], b[2])), fq6.F.Add(v1, v2)))),
fq6.F.Add( fq6.F.Sub( fq6.F.Mul( fq6.F.Add(a[0], a[1]), fq6.F.Add(b[0], b[1])), fq6.F.Add(v0, v1)), fq6.mulByNonResidue(v2)),
fq6.F.Add( fq6.F.Sub( fq6.F.Mul( fq6.F.Add(a[0], a[2]), fq6.F.Add(b[0], b[2])), fq6.F.Add(v0, v2)), v1), } }
// MulScalar is ...
func (fq6 Fq6) MulScalar(base [3][2]*big.Int, e *big.Int) [3][2]*big.Int { // for more possible implementations see g2.go file, at the function g2.MulScalar()
res := fq6.Zero() rem := e exp := base
for !bytes.Equal(rem.Bytes(), big.NewInt(int64(0)).Bytes()) { // if rem % 2 == 1
if bytes.Equal(new(big.Int).Rem(rem, big.NewInt(int64(2))).Bytes(), big.NewInt(int64(1)).Bytes()) { res = fq6.Add(res, exp) } exp = fq6.Double(exp) rem = rem.Rsh(rem, 1) // rem = rem >> 1
} return res }
// Inverse returns the inverse on the Fq6
func (fq6 Fq6) Inverse(a [3][2]*big.Int) [3][2]*big.Int { t0 := fq6.F.Square(a[0]) t1 := fq6.F.Square(a[1]) t2 := fq6.F.Square(a[2]) t3 := fq6.F.Mul(a[0], a[1]) t4 := fq6.F.Mul(a[0], a[2]) t5 := fq6.F.Mul(a[1], a[2])
c0 := fq6.F.Sub(t0, fq6.mulByNonResidue(t5)) c1 := fq6.F.Sub(fq6.mulByNonResidue(t2), t3) c2 := fq6.F.Sub(t1, t4)
t6 := fq6.F.Inverse( fq6.F.Add( fq6.F.Mul(a[0], c0), fq6.mulByNonResidue( fq6.F.Add( fq6.F.Mul(a[2], c1), fq6.F.Mul(a[1], c2))))) return [3][2]*big.Int{ fq6.F.Mul(t6, c0), fq6.F.Mul(t6, c1), fq6.F.Mul(t6, c2), } }
// Div performs a division on the Fq6
func (fq6 Fq6) Div(a, b [3][2]*big.Int) [3][2]*big.Int { return fq6.Mul(a, fq6.Inverse(b)) }
// Square performs a square operation on the Fq6
func (fq6 Fq6) Square(a [3][2]*big.Int) [3][2]*big.Int { s0 := fq6.F.Square(a[0]) ab := fq6.F.Mul(a[0], a[1]) s1 := fq6.F.Add(ab, ab) s2 := fq6.F.Square( fq6.F.Add( fq6.F.Sub(a[0], a[1]), a[2])) bc := fq6.F.Mul(a[1], a[2]) s3 := fq6.F.Add(bc, bc) s4 := fq6.F.Square(a[2])
return [3][2]*big.Int{ fq6.F.Add( s0, fq6.mulByNonResidue(s3)), fq6.F.Add( s1, fq6.mulByNonResidue(s4)), fq6.F.Sub( fq6.F.Add( fq6.F.Add(s1, s2), s3), fq6.F.Add(s0, s4)), } }
// Affine is ...
func (fq6 Fq6) Affine(a [3][2]*big.Int) [3][2]*big.Int { return [3][2]*big.Int{ fq6.F.Affine(a[0]), fq6.F.Affine(a[1]), fq6.F.Affine(a[2]), } }
// Equal is ...
func (fq6 Fq6) Equal(a, b [3][2]*big.Int) bool { return fq6.F.Equal(a[0], b[0]) && fq6.F.Equal(a[1], b[1]) && fq6.F.Equal(a[2], b[2]) }
// Copy is ...
func (fq6 Fq6) Copy(a [3][2]*big.Int) [3][2]*big.Int { return [3][2]*big.Int{ fq6.F.Copy(a[0]), fq6.F.Copy(a[1]), fq6.F.Copy(a[2]), } }
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