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# Prover implementation for Weierstrass curves of the form
# y^2 = x^3 + A * x + B, specifically with a = 0 and b = 7, with group laws
# operating on affine and Jacobian coordinates, including the point at infinity
# represented by a 4th variable in coordinates.

load("group_prover.sage")


class affinepoint:
  def __init__(self, x, y, infinity=0):
    self.x = x
    self.y = y
    self.infinity = infinity
  def __str__(self):
    return "affinepoint(x=%s,y=%s,inf=%s)" % (self.x, self.y, self.infinity)


class jacobianpoint:
  def __init__(self, x, y, z, infinity=0):
    self.X = x
    self.Y = y
    self.Z = z
    self.Infinity = infinity
  def __str__(self):
    return "jacobianpoint(X=%s,Y=%s,Z=%s,inf=%s)" % (self.X, self.Y, self.Z, self.Infinity)


def point_at_infinity():
  return jacobianpoint(1, 1, 1, 1)


def negate(p):
  if p.__class__ == affinepoint:
    return affinepoint(p.x, -p.y)
  if p.__class__ == jacobianpoint:
    return jacobianpoint(p.X, -p.Y, p.Z)
  assert(False)


def on_weierstrass_curve(A, B, p):
  """Return a set of zero-expressions for an affine point to be on the curve"""
  return constraints(zero={p.x^3 + A*p.x + B - p.y^2: 'on_curve'})


def tangential_to_weierstrass_curve(A, B, p12, p3):
  """Return a set of zero-expressions for ((x12,y12),(x3,y3)) to be a line that is tangential to the curve at (x12,y12)"""
  return constraints(zero={
    (p12.y - p3.y) * (p12.y * 2) - (p12.x^2 * 3 + A) * (p12.x - p3.x): 'tangential_to_curve'
  })


def colinear(p1, p2, p3):
  """Return a set of zero-expressions for ((x1,y1),(x2,y2),(x3,y3)) to be collinear"""
  return constraints(zero={
    (p1.y - p2.y) * (p1.x - p3.x) - (p1.y - p3.y) * (p1.x - p2.x): 'colinear_1',
    (p2.y - p3.y) * (p2.x - p1.x) - (p2.y - p1.y) * (p2.x - p3.x): 'colinear_2',
    (p3.y - p1.y) * (p3.x - p2.x) - (p3.y - p2.y) * (p3.x - p1.x): 'colinear_3'
  })


def good_affine_point(p):
  return constraints(nonzero={p.x : 'nonzero_x', p.y : 'nonzero_y'})


def good_jacobian_point(p):
  return constraints(nonzero={p.X : 'nonzero_X', p.Y : 'nonzero_Y', p.Z^6 : 'nonzero_Z'})


def good_point(p):
  return constraints(nonzero={p.Z^6 : 'nonzero_X'})


def finite(p, *affine_fns):
  con = good_point(p) + constraints(zero={p.Infinity : 'finite_point'})
  if p.Z != 0:
    return con + reduce(lambda a, b: a + b, (f(affinepoint(p.X / p.Z^2, p.Y / p.Z^3)) for f in affine_fns), con)
  else:
    return con

def infinite(p):
  return constraints(nonzero={p.Infinity : 'infinite_point'})


def law_jacobian_weierstrass_add(A, B, pa, pb, pA, pB, pC):
  """Check whether the passed set of coordinates is a valid Jacobian add, given assumptions"""
  assumeLaw = (good_affine_point(pa) +
               good_affine_point(pb) +
               good_jacobian_point(pA) +
               good_jacobian_point(pB) +
               on_weierstrass_curve(A, B, pa) +
               on_weierstrass_curve(A, B, pb) +
               finite(pA) +
               finite(pB) +
               constraints(nonzero={pa.x - pb.x : 'different_x'}))
  require = (finite(pC, lambda pc: on_weierstrass_curve(A, B, pc) +
             colinear(pa, pb, negate(pc))))
  return (assumeLaw, require)


def law_jacobian_weierstrass_double(A, B, pa, pb, pA, pB, pC):
  """Check whether the passed set of coordinates is a valid Jacobian doubling, given assumptions"""
  assumeLaw = (good_affine_point(pa) +
               good_affine_point(pb) +
               good_jacobian_point(pA) +
               good_jacobian_point(pB) +
               on_weierstrass_curve(A, B, pa) +
               on_weierstrass_curve(A, B, pb) +
               finite(pA) +
               finite(pB) +
               constraints(zero={pa.x - pb.x : 'equal_x', pa.y - pb.y : 'equal_y'}))
  require = (finite(pC, lambda pc: on_weierstrass_curve(A, B, pc) +
             tangential_to_weierstrass_curve(A, B, pa, negate(pc))))
  return (assumeLaw, require)


def law_jacobian_weierstrass_add_opposites(A, B, pa, pb, pA, pB, pC):
  assumeLaw = (good_affine_point(pa) +
               good_affine_point(pb) +
               good_jacobian_point(pA) +
               good_jacobian_point(pB) +
               on_weierstrass_curve(A, B, pa) +
               on_weierstrass_curve(A, B, pb) +
               finite(pA) +
               finite(pB) +
               constraints(zero={pa.x - pb.x : 'equal_x', pa.y + pb.y : 'opposite_y'}))
  require = infinite(pC)
  return (assumeLaw, require)


def law_jacobian_weierstrass_add_infinite_a(A, B, pa, pb, pA, pB, pC):
  assumeLaw = (good_affine_point(pa) +
               good_affine_point(pb) +
               good_jacobian_point(pA) +
               good_jacobian_point(pB) +
               on_weierstrass_curve(A, B, pb) +
               infinite(pA) +
               finite(pB))
  require = finite(pC, lambda pc: constraints(zero={pc.x - pb.x : 'c.x=b.x', pc.y - pb.y : 'c.y=b.y'}))
  return (assumeLaw, require)


def law_jacobian_weierstrass_add_infinite_b(A, B, pa, pb, pA, pB, pC):
  assumeLaw = (good_affine_point(pa) +
               good_affine_point(pb) +
               good_jacobian_point(pA) +
               good_jacobian_point(pB) +
               on_weierstrass_curve(A, B, pa) +
               infinite(pB) +
               finite(pA))
  require = finite(pC, lambda pc: constraints(zero={pc.x - pa.x : 'c.x=a.x', pc.y - pa.y : 'c.y=a.y'}))
  return (assumeLaw, require)


def law_jacobian_weierstrass_add_infinite_ab(A, B, pa, pb, pA, pB, pC):
  assumeLaw = (good_affine_point(pa) +
               good_affine_point(pb) +
               good_jacobian_point(pA) +
               good_jacobian_point(pB) +
               infinite(pA) +
               infinite(pB))
  require = infinite(pC)
  return (assumeLaw, require)


laws_jacobian_weierstrass = {
  'add': law_jacobian_weierstrass_add,
  'double': law_jacobian_weierstrass_double,
  'add_opposite': law_jacobian_weierstrass_add_opposites,
  'add_infinite_a': law_jacobian_weierstrass_add_infinite_a,
  'add_infinite_b': law_jacobian_weierstrass_add_infinite_b,
  'add_infinite_ab': law_jacobian_weierstrass_add_infinite_ab
}


def check_exhaustive_jacobian_weierstrass(name, A, B, branches, formula, p):
  """Verify an implementation of addition of Jacobian points on a Weierstrass curve, by executing and validating the result for every possible addition in a prime field"""
  F = Integers(p)
  print "Formula %s on Z%i:" % (name, p)
  points = []
  for x in xrange(0, p):
    for y in xrange(0, p):
      point = affinepoint(F(x), F(y))
      r, e = concrete_verify(on_weierstrass_curve(A, B, point))
      if r:
        points.append(point)

  for za in xrange(1, p):
    for zb in xrange(1, p):
      for pa in points:
        for pb in points:
          for ia in xrange(2):
            for ib in xrange(2):
              pA = jacobianpoint(pa.x * F(za)^2, pa.y * F(za)^3, F(za), ia)
              pB = jacobianpoint(pb.x * F(zb)^2, pb.y * F(zb)^3, F(zb), ib)
              for branch in xrange(0, branches):
                assumeAssert, assumeBranch, pC = formula(branch, pA, pB)
                pC.X = F(pC.X)
                pC.Y = F(pC.Y)
                pC.Z = F(pC.Z)
                pC.Infinity = F(pC.Infinity)
                r, e = concrete_verify(assumeAssert + assumeBranch)
                if r:
                  match = False
                  for key in laws_jacobian_weierstrass:
                    assumeLaw, require = laws_jacobian_weierstrass[key](A, B, pa, pb, pA, pB, pC)
                    r, e = concrete_verify(assumeLaw)
                    if r:
                      if match:
                        print "  multiple branches for (%s,%s,%s,%s) + (%s,%s,%s,%s)" % (pA.X, pA.Y, pA.Z, pA.Infinity, pB.X, pB.Y, pB.Z, pB.Infinity)
                      else:
                        match = True
                      r, e = concrete_verify(require)
                      if not r:
                        print "  failure in branch %i for (%s,%s,%s,%s) + (%s,%s,%s,%s) = (%s,%s,%s,%s): %s" % (branch, pA.X, pA.Y, pA.Z, pA.Infinity, pB.X, pB.Y, pB.Z, pB.Infinity, pC.X, pC.Y, pC.Z, pC.Infinity, e)
  print


def check_symbolic_function(R, assumeAssert, assumeBranch, f, A, B, pa, pb, pA, pB, pC):
  assumeLaw, require = f(A, B, pa, pb, pA, pB, pC)
  return check_symbolic(R, assumeLaw, assumeAssert, assumeBranch, require)

def check_symbolic_jacobian_weierstrass(name, A, B, branches, formula):
  """Verify an implementation of addition of Jacobian points on a Weierstrass curve symbolically"""
  R.<ax,bx,ay,by,Az,Bz,Ai,Bi> = PolynomialRing(QQ,8,order='invlex')
  lift = lambda x: fastfrac(R,x)
  ax = lift(ax)
  ay = lift(ay)
  Az = lift(Az)
  bx = lift(bx)
  by = lift(by)
  Bz = lift(Bz)
  Ai = lift(Ai)
  Bi = lift(Bi)

  pa = affinepoint(ax, ay, Ai)
  pb = affinepoint(bx, by, Bi)
  pA = jacobianpoint(ax * Az^2, ay * Az^3, Az, Ai)
  pB = jacobianpoint(bx * Bz^2, by * Bz^3, Bz, Bi)

  res = {}

  for key in laws_jacobian_weierstrass:
    res[key] = []

  print ("Formula " + name + ":")
  count = 0
  for branch in xrange(branches):
    assumeFormula, assumeBranch, pC = formula(branch, pA, pB)
    pC.X = lift(pC.X)
    pC.Y = lift(pC.Y)
    pC.Z = lift(pC.Z)
    pC.Infinity = lift(pC.Infinity)

    for key in laws_jacobian_weierstrass:
      res[key].append((check_symbolic_function(R, assumeFormula, assumeBranch, laws_jacobian_weierstrass[key], A, B, pa, pb, pA, pB, pC), branch))

  for key in res:
    print "  %s:" % key
    val = res[key]
    for x in val:
      if x[0] is not None:
        print "    branch %i: %s" % (x[1], x[0])

  print